The smallest number that, when divided by 21, 45, and 56, leaves a remainder of 7 is 2527.
To find the smallest number that satisfies the given conditionsThe remaining 7 must be added after determining the least common multiple (LCM) of the numbers 21, 45, and 56.
Find the LCM of 21, 45, and 56 first:
21 = 3 * 7
45 = 3^2 * 5
56 = 2^3 * 7
The LCM is the product of the highest powers of all the prime factors involved:
[tex]LCM = 2^3 * 3^2 * 5 * 7 = 8 * 9 * 5 * 7 = 2520[/tex]
Now, let's add the remainder of 7 to the LCM:
Smallest number = LCM + Remainder = 2520 + 7 = 2527
Therefore, the smallest number that, when divided by 21, 45, and 56, leaves a remainder of 7 is 2527.
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Find the indefinite integral. (Remember to use absolute values where appropriate. Use C for the constant of inter | 2x² +8X=1 dx X-5 Evaluate the limit, using L'Hôpital's Rule if necessary. (If you need to use oo or -co, enter INFINITY or 6x³ - 8x + 9 lim X-- 4x³ +9 Find the limit (if it exists). (If an answer does not exist, enter DNE. Round your answer to four deci lim x-6+ 5
The indefinite integral of 2x^2 + 8x - 1 dx is (2/3)x^3 + 4x^2 - x + C, where C is the constant of integration.
To find the indefinite integral of 2x^2 + 8x - 1 dx, we need to integrate each term separately.
The integral of x^n dx, where n is a constant, is (1/(n+1))x^(n+1). Applying this rule, we find:
∫(2x^2 + 8x - 1) dx = (2/3)x^3 + 4x^2 - x + C
The constant of integration, denoted by C, accounts for the fact that the derivative of a constant is zero. It represents an arbitrary constant term that could have been present in the original function but was lost during differentiation.
For the limit of (6x^3 - 8x + 9) / (4x^3 + 9) as x approaches -∞, we can use L'Hôpital's Rule if necessary.
L'Hôpital's Rule states that if the limit of a quotient of two functions is indeterminate (such as 0/0 or ∞/∞), then the limit of the derivative of the numerator divided by the derivative of the denominator may yield the same result.
In this case, the limit is not indeterminate as x approaches -∞, so L'Hôpital's Rule is not needed.
To find the limit of (6x^3 - 8x + 9) / (4x^3 + 9) as x approaches -∞, we can evaluate the expression by plugging in -∞ for x:
lim(x→-∞) (6x^3 - 8x + 9) / (4x^3 + 9) = (-∞)^3 / (∞)^3 = -1
Therefore, the limit of (6x^3 - 8x + 9) / (4x^3 + 9) as x approaches -∞ is -1.
Lastly, for the limit of 5 as x approaches 6+, no further calculations are necessary. The limit is simply 5, meaning that as x approaches 6 from the right (positive direction), the value of the function approaches 5.
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Solve by using a system of two equations in two variables.
Six years ago, Joe Foster was two years more than five times as old as his daughter. Six years from now, he will be 11 years more than twice as old as she will be. How old is Joe ?
Answer:
Joe is 43 years old.
Step-by-step explanation:
Let x be the age of Joe Foster at present
Let y be the age of his daughter at present
Six years ago, their ages are:
x - 6 and y - 6 respectively
Six years from now, their ages will be:
x + 6 and y + 6
Six years ago, Joe Foster was two years more than five times as old as his daughter.
(x - 6) = 5(y-6) + 2
Simplify
x - 6 = 5y - 30 + 2
x = 5y -30 + 2 + 6
x = 5y - 22 ---equation 1
Six years from now, he will be 11 years more than twice as old as she will be.
(x + 6) = 2(y+6) + 11
Simplify
x + 6 = 2y + 12 + 11
x = 2y + 12 + 11 -6
x = 2y + 17 ----equation 2
Subtract equation 2 from equation 1
x = 5y - 22
-(x = 2y + 17)
0 = 3y - 39
Transpose
3y = 39
y = 39/3
y = 13
Substitute y = 3 to equation 1 x = 5y - 22
x = 5(13) - 22
x = 65 - 22
x = 43
Suppose that the streets of a city are laid out in a grid with streets running north–south and east–west. Consider the following scheme for patrolling an area of 16 blocks by 16 blocks. An officer commences walking at the intersection in the center of the area. At the corner of each block the officer randomly elects to go north, south, east, or west. What is the probability that the officer will
a reach the boundary of the patrol area after walking the first 8 blocks?
b return to the starting point after walking exactly 4 blocks?
a) The probability that the officer will reach the boundary of the patrol area after walking the first 8 blocks can be calculated by considering the possible paths the officer can take. Since the officer randomly elects to go north, south, east, or west at each corner, there are 4 possible directions at each intersection.
After walking 8 blocks, the officer will have encountered 8 intersections and made 8 random choices. The total number of possible paths the officer can take is 4⁸ since there are 4 choices at each intersection. Out of these paths, we need to determine the number of paths that lead to the boundary of the patrol area.
To reach the boundary after 8 blocks, the officer must choose the correct sequence of directions that eventually takes them to one of the four sides of the patrol area. For each choice at an intersection, there is a 1/4 probability of selecting the correct direction towards the boundary. Therefore, the probability of the officer reaching the boundary after walking the first 8 blocks is (1/4)⁸.
b) To calculate the probability of the officer returning to the starting point after walking exactly 4 blocks, we need to consider the possible paths again. After 4 blocks, the officer will have encountered 4 intersections and made 4 random choices. The total number of possible paths the officer can take is 4⁴.
In order to return to the starting point, the officer must choose the correct sequence of directions that leads them back to the starting intersection. There is only one correct path that takes the officer back to the starting point after exactly 4 blocks. Therefore, the probability of the officer returning to the starting point after walking exactly 4 blocks is 1 out of the total number of possible paths, which is 1/4⁴.
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Show that the quadrilateral having vertices at (1, −2, 3), (4,
3, −1), (2, 2, 1) and (5, 7, −3) is a parallelogram, and find its
area.
The quadrilateral with vertices at (1, -2, 3), (4, 3, -1), (2, 2, 1), and (5, 7, -3) is a parallelogram, and its area can be found using the cross product of two adjacent sides.
1
To show that the quadrilateral is a parallelogram, we need to demonstrate that opposite sides are parallel. Two vectors are parallel if and only if their cross product is the zero vector.
Let's consider the vectors formed by two adjacent sides of the quadrilateral: v1 = (4, 3, -1) - (1, -2, 3) = (3, 5, -4) and v2 = (2, 2, 1) - (1, -2, 3) = (1, 4, -2).
Now, we calculate their cross product: v1 × v2 = (3, 5, -4) × (1, 4, -2) = (-12, -2, 22).
Since the cross product is not the zero vector, we can conclude that the quadrilateral is indeed a parallelogram.
To find the area of the parallelogram, we can calculate the magnitude of the cross product: |v1 × v2| = √((-12)² + (-2)² + 22²) = √(144 + 4 + 484) = √632 = 2√158.
Therefore, the area of the quadrilateral is 2√158 square units.
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Starting salaries for engineering students have a mean of $2,600 and a standard deviation of $1600. What is the probability that a random sample of 64 students from the school will have an average salary of more than $3,000?
The problem states that the starting salaries for engineering students have a mean of $2,600 and a standard deviation of $1,600. We are asked to find the probability that a random sample of 64 students from the school will have an average salary of more than $3,000 is approximately 2.28%.
To solve this problem, we can use the Central Limit Theorem, which states that the distribution of sample means tends to be approximately normal, regardless of the shape of the population distribution, as the sample size increases.
Since the sample size is large (n = 64), we can assume that the distribution of sample means will be approximately normal. The mean of the sample means will still be $2,600, but the standard deviation of the sample means, also known as the standard error, will be the population standard deviation divided by the square root of the sample size. In this case, the standard error is $1,600 / sqrt(64) = $200.
Next, we need to calculate the z-score, which measures the number of standard deviations an observation is from the mean. The z-score can be calculated using the formula: z = (sample mean - population mean) / standard error. In this case, the z-score is (3000 - 2600) / 200 = 2.
Finally, we can use a standard normal distribution table or a calculator to find the probability of a z-score greater than 2. The probability is approximately 0.0228 or 2.28%.
Therefore, the probability that a random sample of 64 students from the school will have an average salary of more than $3,000 is approximately 2.28%.
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Does g(t) = 31- 35* +120° +90 have any inflection points? If so, identify them. + Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. An inflection p
The correct answer is : g(t) = 31 - 35t + 120t^2 + 90 does not have any inflection points.
An inflection point is a point on the graph of a function where the concavity changes. In other words, it is a point where the second derivative changes sign. To determine if a function has inflection points, we need to analyze the concavity of the function.
In the given function g(t) = 31 - 35t + 120t^2 + 90, we can find the second derivative by taking the derivative of the first derivative. The first derivative is g'(t) = -35 + 240t, and the second derivative is g''(t) = 240.
Since the second derivative, g''(t) = 240, is a constant, it does not change sign. Therefore, there are no points where the concavity changes, and the function g(t) = 31 - 35t + 120t^2 + 90 does not have any inflection points.
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(1 point) Solve the initial-value problem 24" + 5y' – 3y = 0, y(0) = -1, y (0) = 31. Answer: y(2)
After solving the initial-value problem, the value of y(2) is 1.888.
Given differential equation is 24y + 5y - 3y = 0`.
Initial conditions are y(0) = -1, y'(0) = 31.
To solve the given initial-value problem, we can use the characteristic equation method which gives the value of `y`.
Step 1: Write the characteristic equation. We can rewrite the differential equation as:
24r² + 5r - 3 = 0
Solve the above equation using the quadratic formula to get:
r = (-5 ± √(5² - 4(24)(-3))) / (2(24))
This simplifies to:
r = (-5 ± 7i) / 48
Step 2: Write the general solution.
Using the roots from above, the general solution to the differential equation is:
y(t) = [tex]e^(-5t/48) (c₁cos((7/48)t) + c₂sin((7/48)t))[/tex]
where `c₁` and `c₂` are constants.
Step 3: Find the constants `c₁` and `c₂` using the initial conditions. To find `c₁` and `c₂`, we use the initial conditions `y(0) = -1, y'(0) = 31`.
The value of `y(0)` is:
y(0) = e^(0)(c₁cos(0) + c₂sin(0))
= c₁
The value of `y'(0)` is:
y'(t) = -5/48e^(-5t/48)(c₁cos((7/48)t) + c₂sin((7/48)t)) + 7/48e^(-5t/48)(-c₁sin((7/48)t) + c₂cos((7/48)t))
y'(0) = -5/48(c₁cos(0) + c₂sin(0)) + 7/48(-c₁sin(0) + c₂cos(0))
= -5/48c₁ + 7/48c₂
Substituting `y(0) = -1` and `y'(0) = 31`, we get the system of equations:
-1 = c₁
31 = -5/48c₁ + 7/48c₂
Solving the above system of equations for `c₁` and `c₂`, we get:
c₁ = -1
c₂ = 2321/33
Step 4: Find `y(2)`. Using the constants found in step 3, we can now find `y(2)`.
y(2) = e^(-5/24)(-1 cos(7/24) + 2321/336 sin(7/24))
≈ 1.888
Hence, the value of y(2) is 1.888.
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Let f be the function 8x1 for x < -1 f(x) = ax + b for − 1 ≤ x ≤ 1/1/ 3x-1 for x > 1/1/ Find the values of a and b that make the function continuous. (Use symbolic notation and fractions where n
The values of a and b that make the function continuous are a = 3 and b = -11.
To make the function continuous, we need to ensure that the function values match at the points where the function changes its definition.
At x = -1, we have:
f(-1) = 8(-1) = -8
At x = 1, we have:
f(1) = a(1) + b
Setting these two function values equal, we have:
-8 = a(1) + b
At x = 1, the derivative of the left and right portions of the function should also match to maintain continuity. Taking the derivative of f(x) for x > 1, we have:
f'(x) = 3
Setting this equal to the derivative of the middle portion of the function, we have:
3 = a
Substituting the value of a into the equation -8 = a + b, we get:
-8 = 3 + b
Simplifying, we find:
b = -11
Therefore, the values of a and b that make the function continuous are a = 3 and b = -11.
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Box-Office Receipts The total worldwide box-office receipts for a long-running movie are approximated by the following function where T(x) is measured in millions of dollars and x is the number of years since the movie's release. 120x² T(x) = x²+4 How fast are the total receipts changing 1 yr, 5 yr, and 6 yr after its release? (Round your answers to two decimal places.) after 1 yr $ million/year after 5 yr $ million/year after 6 yr $ million/year.
The total receipts changing 1 yr, 5 yr, and 6 yr after its release
After 1 year: $240.00 million/year
After 5 years: $2,400.00 million/year
After 6 years: $2,880.00 million/year
Let's have stepwise solution:
To determine how fast the total receipts are changing after 1 year, 5 years, and 6 years, we need to find the derivative of the function T(x) with respect to x. Then we can evaluate the derivatives at the given values of x.
To find the derivative of T(x), we'll differentiate each term separately:
d(T(x))/dx = d(120x^2)/dx + d(x^2)/dx + d(4)/dx
= 240x + 2x
Simplifying this expression, we have:
d(T(x))/dx = 242x
Now we can evaluate the derivative at the specified values of x
a) After 1 year (x = 1):
d(T(x))/dx = 242x
= 242(1)
= 242 million/year
b) After 5 years (x = 5):
= 242(5) = 1210 million/year
c) After 6 years (x = 6):
= 242(6) = 1452 million/year
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Question 1 Linear Equations. . Solve the following DE using separable variable method. (i) (x – 4) y4dx – 23 (y2 – 3) dy = 0. dy = 1, y (0) = 1. dx (ii) e-y -> (1+ = : = Question 2 Second Orde
The solution to the The solution to the differential equation is:
y² – 3 = (1/2)x² - 4x - 2
(ii) the second part of your question seems to be incomplete or unclear.
(i) to solve the differential equation (x – 4) y⁴ dx – 23 (y² – 3) dy = 0, we'll use the separable variable method.
rearranging the terms, we have:
(y² – 3) dy = (x – 4) y⁴ dx
now, we can separate the variables by dividing both sides by y⁴ (y² – 3):
(1 / y⁴) (y² – 3) dy = (x – 4) dx
simplifying the left side:
(1 / y⁴) (y² – 3) dy = (1 / y²) dy
integrating both sides:
∫ (1 / y²) dy = ∫ (x – 4) dx
to integrate the left side, we can use the substitution u = y² – 3:
∫ (1 / y²) dy = ∫ du
= u + c1
= y² – 3 + c1
now, integrating the right side:
∫ (x – 4) dx = (1/2)x² - 4x + c2
putting everything together, we have:
y² – 3 + c1 = (1/2)x² - 4x + c2
we can combine the constants c1 and c2 into a single constant c:
y² – 3 = (1/2)x² - 4x + c
now, let's use the initial condition dy/dx = 1, y(0) = 1 to find the value of c. substituting x = 0 and y = 1 into the equation:
1² – 3 = (1/2)(0)² - 4(0) + c
-2 = c
please provide the complete equation or information for question 2, and i'll be happy to help you solve it.
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Find the volume of the solid region Q cut from the sphere
x^2+y^2+z^2=4 by the cylinder r = 2 sintheta
The volume of the solid region Q cut from the sphere x^2+y^2+z^2=4 by the cylinder r = 2 sintheta is (8/45) π.
Since the cylinder is defined in polar coordinates, we will use polar coordinates to solve this problem.
The equation of the sphere is x^2 + y^2 + z^2 = 4, which can be rewritten in terms of polar coordinates as:
r^2 + z^2 = 4 (1)
The equation of the cylinder is r = 2 sin(theta), which again can be rewritten as r^2 = 2r sin(theta):
r^2 - 2r sin(theta) = 0
r(r - 2 sin(theta)) = 0
So, either r = 0 or r = 2 sin(theta).
We want to find the volume of the solid region Q that is cut from the sphere by the cylinder. Since the cylinder is symmetric about the z-axis, we only need to consider the part of the sphere in the first octant (x, y, z > 0) that lies inside the cylinder.
In polar coordinates, the limits of integration are:
0 ≤ r ≤ 2 sin(theta)
0 ≤ theta ≤ π/2
0 ≤ z ≤ sqrt(4 - r^2)
Using the cylindrical coordinate triple integral, we can write the volume of Q as:
V = ∫∫∫Q dV
= ∫∫∫Q r dz dr dtheta
= ∫0^(π/2) ∫0^(2 sin(theta)) ∫0^(sqrt(4-r^2)) r dz dr dtheta
= ∫0^(π/2) ∫0^(2 sin(theta)) r(sqrt(4-r^2)) dr dtheta
= ∫0^(π/2) [-1/3 (4 - r^2)^(3/2)]_0^(2 sin(theta)) dtheta
= ∫0^(π/2) [-8/3 (sin^2(theta))^3/2 + 8/3] dtheta
= [16/9 - 32/15] π/2
= (8/45) π
Therefore, the volume of the solid region Q cut from the sphere x^2+y^2+z^2=4 by the cylinder r = 2 sin(theta) is (8/45) π.
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Find equations of the spheres with center (1,−3,6) that just touch (at only one point) the following planes. (a) xy-plane (x−1) 2
+(y+3) 2
+(z−6) 2
=36 (b) yz-plane (c) xz-plane
The spheres with center (1, -3, 6) that just touch the xy-plane, yz-plane, and xz-plane can be described by the following equations:
(a) The sphere touching the xy-plane has a radius of 6 and its equation is [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 36\)[/tex].
(b) The sphere touching the yz-plane has a radius of 1 and its equation is [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 1\)[/tex].
(c) The sphere touching the xz-plane has a radius of 9 and its equation is [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 81\)[/tex].
In summary, the spheres that just touch the xy-plane, yz-plane, and xz-plane have equations [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 36\)[/tex], [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 1\)[/tex], and [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 81\)[/tex] respectively.
To find the equation of a sphere with center (h, k, l) and radius r, we use the formula [tex]\((x-h)^2 + (y-k)^2 + (z-l)^2 = r^2\)[/tex].
(a) For the sphere touching the xy-plane, the center is (1, -3, 6) and the radius is 6. Thus, the equation is [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 36\)[/tex].
(b) Similarly, for the sphere touching the yz-plane, the center is (1, -3, 6) and the radius is 1. The equation becomes [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 1\)[/tex].
(c) For the sphere touching the xz-plane, the center is (1, -3, 6) and the radius is 9. The equation is [tex]\((x-1)^2 + (y+3)^2 + (z-6)^2 = 81\)[/tex].
Thus, we have obtained the equations for the spheres touching the xy-plane, yz-plane, and xz-plane respectively.
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Classify each pair of labeled angles as complementary, supplementary, or neither.
Drag and drop the choices into the boxes to correctly complete the table. Each category may have any number of pair of angles.
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
complementary supplementary neither
Figure 1: Neither supplementary angles nor complementary
Figure 2: Complementary angles.
Figure 3: Neither supplementary angles nor complementary
Since we know that,
Complementary angles are those whose combined angle is 90 degrees or less. To put it another way, two angles are said to be complimentary if they combine to make a right angle. In this case, we say that the two angles work well together.
And we also know that,
The term "supplementary angles" refers to a pair of angles that always add up to 180°. The term "supplementary" refers to "something that is supplied to complete a thing." As a result, these two perspectives are referred to as supplements.
If two angles add up to 180°, they are considered to be supplementary angles. When supplementary angles are combined, they make a straight angle (180°).
Explanation of figure 1;
The given angles are,
90 + 89 = 179
Since it is neither 180 nor 90
Hence these angles are neither complementary nor supplementary angles.
Explanation of figure 2:
The given angles are,
61 degree and 29 degree
Then 61 + 29 = 90 degree
Therefore,
These are complementary angles.
Explanation of figure 3:
The given angles are,
63 degree and 47 degree
Then 63 + 47 = 110 degree
Therefore,
These are complementary angles.
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Ava ran at an average speed of 6 miles per hour. Kelly ran at an average speed of 8 miles per hour.When will Ava and Kelly be 3/4 mile apart ?
Ava and Kelly will be 3/4 mile apart after 22.5 minutes.
To determine when Ava and Kelly will be 3/4 mile apart, we can consider their relative speed. The relative speed is the difference between their individual speeds.
Ava's speed = 6 miles per hour
Kelly's speed = 8 miles per hour
The relative speed of Ava and Kelly is:
Relative speed = Kelly's speed - Ava's speed
= 8 miles per hour - 6 miles per hour
= 2 miles per hour
This means that Ava and Kelly are moving away from each other at a rate of 2 miles per hour.
To calculate the time it takes for them to be 3/4 mile apart, we can use the formula:
Distance = Speed × Time
In this case, the distance they need to cover is 3/4 mile, and the relative speed is 2 miles per hour.
3/4 mile = 2 miles per hour × Time
Simplifying the equation:
3/4 = 2 × Time
Dividing both sides by 2:
3/4 × 1/2 = Time
3/8 = Time
Therefore, it will take Ava and Kelly 3/8 hours (or 22.5 minutes) to be 3/4 mile apart.
Thus, Ava and Kelly will be 3/4 mile apart after 22.5 minutes.
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00 (1 point) Use the ratio test to determine whether n(-4)" converges or n! n=12 diverges. (a) Find the ratio of successive terms. Write your answer as a fully simplified fraction. For n > 12, an+1 li
The series given by aₙ = (-4)ⁿ/n! converges.
To determine whether the series given by aₙ = (-4)ⁿ/n! converges or diverges, we can apply the ratio test.
The ratio test states that if the limit of the absolute value of the ratio of successive terms is less than 1, the series converges. If the limit is greater than 1 or it does not exist, the series diverges.
Let's find the ratio of successive terms:
aₙ = (-4)ⁿ/n!
aₙ₊₁ = (-4)ⁿ⁺¹/(n+1)!
To calculate the ratio, we divide aₙ₊₁ by aₙ:
|r| = |aₙ₊₁ / aₙ| = |((-4)ⁿ⁺¹/(n+1)!) / ((-4)ⁿ/n!)|
Simplifying the expression:
|r| = |(-4)ⁿ⁺¹/(n+1)!| * |n! / (-4)ⁿ|
The factor of (-4)ⁿ cancels out:
|r| = |-4/(n+1)|
Taking the limit as n approaches infinity:
Lim (n→∞) |-4/(n+1)| = 0
Since the limit is 0, which is less than 1, we can conclude that the series converges by the ratio test.
Therefore, the series given by aₙ = (-4)ⁿ/n! converges.
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In the following exercises, find the Maclaurin series of each function.
207. 70-4 209. ising Identity 16x) = sinº, sin x = - 200(2 foos 2
The Maclaurin series of function f(x) = [tex]e^{x^3}[/tex] is ∑₀ (x³)ⁿ/n!
What is the Maclaurin series?
A function's Taylor series or Taylor expansion is an infinite sum of terms represented in terms of the function's derivatives at a single point. Near this point, the function and the sum of its Taylor series are equivalent to most typical functions.
Here, we have
Given: f(x) = [tex]e^{x^3}[/tex]
Using the Maclaurin series we get
f(x) = f(0) + f'(0)x/1! + f"(0)x²/2! + .....fⁿ(0)xⁿ/n!...(1)
Now, the Maclaurin series for f(x) = [tex]e^{x}[/tex]
f(0) = 1
f'(x) = [tex]e^{x}[/tex] , f'(0) = 1
f"(x) = [tex]e^{x}[/tex], f"(0) = 1
.
.
.
.
fⁿ(x) = [tex]e^{x}[/tex], fⁿ(0) = 1
Now, equation(1) becomes:
f(x) = f(0) + f'(0)x/1! + f"(0)x²/2! + .....fⁿ(0)xⁿ/n!
f(x) = 1 + x + x²/2! + ....xⁿ/n!
f(x) = [tex]e^{x}[/tex] = ∑₀ xⁿ/n!....(2)
Now, the Maclaurin series for f(x) = [tex]e^{x^3}[/tex]
f(x) = [tex]e^{x^3}[/tex] = ∑₀ (x³)ⁿ/n!
Hence, the Maclaurin series of function f(x) = [tex]e^{x^3}[/tex] is ∑₀ (x³)ⁿ/n!
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(10 points) Suppose a virus spreads so that the number N of people infected grows tially with time t. The table below shows how many days it takes from the initial to have various numbers of cases. t=# of days 36 63 N=# of cases 1 million 8 million How many days since the initial outbreak until the virus infects 40 million people? ( to the nearest whole number of days)
It would take approximately 59 days since the initial outbreak until the virus infects 40 million people.
The growth rate can be found by dividing the final number of cases by the initial number of cases and then taking the t-th root of that value, where t is the number of days it took to reach the final number of cases from the initial.
In this case, the growth rate is (8 million / 1 million)^(1/27), rounded to three decimal places which is 1.297.
Using this growth rate, we can calculate how many days it would take to reach 40 million cases:
40 million = 1 million * (1.297)^d
Solving for d, we get:
d = log(40)/log(1.297)
d ≈ 58.5
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Question Three = (1) Find the area under y = x3 over [0, 1] using the following parametrizations y a) x x =ť, y=t6. (6) x =ť, y=t'. t = у = =
We are given the function y = x^3 and asked to find the area under the curve over the interval [0, 1] using two different parametrizations: (a) x = t, y = t^6, and (b) x = t, y = t'.
The answer involves finding the parametric equations, calculating the derivatives, setting up the integral, and evaluating it to find the area.
(a) For the parametrization x = t, y = t^6, we can calculate the derivatives dx/dt = 1 and dy/dt = 6t^5. The integral for finding the area becomes ∫[0,1] y dx = ∫[0,1] (t^6)(1) dt. Evaluating this integral gives us the area under the curve for this parametrization.
(b) For the parametrization x = t, y = t', we need to find the derivative dy/dx. Differentiating y = x^3 with respect to x gives us dy/dx = 3x^2. Substituting this into the integral ∫[0,1] y dx = ∫[0,1] (t')(3x^2) dt, we can evaluate the integral to find the area under the curve for this parametrization.
By evaluating the integrals for both parametrizations, we can find the respective areas under the curve y = x^3 over the interval [0, 1]. The specific calculations will depend on the parametrization used and involve integrating the appropriate expression with respect to the parameter t.
Note: The specific calculations for the integrals are not provided in this summary, but they can be performed using standard integration techniques to find the areas under the curve for each parametrization.
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(1 point) Find the Laplace transform of 0, ƒ(t) = = 2sin(nt), 0, F(s) = = t < 2 2
The Laplace transform of ƒ(t) = 2sin(nt) is F(s) = 2n / (s² + n²), valid for t < 2. It represents the Laplace transform of ƒ(t) = 2sin(nt) for t < 2.
The Laplace transform of a function ƒ(t) is defined as F(s) = ∫[0 to ∞] ƒ(t)e^(-st) dt. For the given function ƒ(t) = 2sin(nt), where n is a constant, we can apply the Laplace transform formula for sine functions: L{sin(nt)} = 2n / (s² + n²).
The Laplace transform is valid for t < 2, so the transform function F(s) is only applicable within that interval. The result can be obtained by substituting the appropriate values into the Laplace transform formula. Thus, F(s) = 2n / (s² + n²) represents the Laplace transform of ƒ(t) = 2sin(nt) for t < 2.
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Find the equation of the plane containing lines Li and he L1 = > x = 2t+1, y = 3t+2 z=4t+ 3 L2=> x=s+2 y=2s+4 z=-4s-1.
The equation of the plane is -14x + 12y - z + d = 0, where d is a constant.
What is the equation of the plane containing lines L1 and L2?
To find the equation of the plane containing lines L1 and L2, we first need to find two points on each line.
For L1, we can choose t=0 and t=1 to get point P1(1, 2, 3) and point P2(3, 5, 7).
For L2, we can choose s=0 and s=1 to get point P3(2, 4, -1) and point P4(3, 6, -5).
Next, we can find two vectors that lie on the plane by subtracting the coordinates of the two points:
Vector v1 = P2 - P1 = (3-1, 5-2, 7-3) = (2, 3, 4)
Vector v2 = P4 - P3 = (3-2, 6-4, -5+1) = (1, 2, -4)
Finally, we can find the equation of the plane by taking the cross product of the two vectors:
Normal vector n = v1 x v2 = (2, 3, 4) x (1, 2, -4) = (-14, 12, -1)
Therefore, the equation of the plane containing lines L1 and L2 is -14x + 12y - z + d = 0, where d is a constant.
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1. Find the derivative of: "+sin(x) *x+cos(x) Simplify as fully as possible. (2 marks)
The derivative of the function sin(x) * x + cos(x) is xcos(x)
How to find the derivative of the functionFrom the question, we have the following parameters that can be used in our computation:
sin(x) * x + cos(x)
Express properly
So, we have
f(x) = sin(x) * x + cos(x)
The derivative of the functions can be calculated using the first principle which states that
if f(x) = axⁿ, then f'(x) = naxⁿ⁻¹
Using the above as a guide, we have the following:
If f(x) = sin(x) * x + cos(x), then
f'(x) = xcos(x)
Hence, the derivative of the function is xcos(x)
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Social scientists gather data from samples instead of populations because
a. samples are much larger and more complete.
b. samples are more trustworthy.
c. populations are often too large to test.
d. samples are more meaningful and interesting
Social scientists gather data from samples instead of populations because c. populations are often too large to test.
Social scientists often cannot test an entire population due to its size, so they gather data from a smaller group or sample that is representative of the larger population. This allows them to make inferences about the larger population based on the data collected from the sample. The sample size must be large enough to accurately represent the population, but it is not necessarily larger or more complete than the population itself. Trustworthiness, meaning, and interest are subjective and do not necessarily determine why social scientists choose to gather data from samples.
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00 (a) Compute 84 of 5 10n3 n=1 (6) Estimate the error in using s4 as an approximation of the sum of the series. (l.e. use Soos f(c)dx > r4) (c) Use n = 4 and Sn + f(x)dar < s < Sn+ n+1 ។ f(x)do to
The sum of the series is 22450. The error in using S4 is infinite. The bounds for the sum are S4 + divergent and [tex]S4 + [510/4(6^4 - 5^4)].[/tex]
To compute the sum of the series [tex]\(\sum_{n=1}^{6} 5 \cdot 10n^3\),[/tex] we substitute the values of \(n\) from 1 to 6 into the expression [tex]\(5 \cdot 10n^3\)[/tex] and add them up:
[tex]\[S_6 = 5 \cdot 10(1^3) + 5 \cdot 10(2^3) + 5 \cdot 10(3^3) + 5 \cdot 10(4^3) + 5 \cdot 10(5^3) + 5 \cdot 10(6^3)\][/tex]
Simplifying the expression:
[tex]\[S_6 = 5 \cdot 10 + 5 \cdot 80 + 5 \cdot 270 + 5 \cdot 640 + 5 \cdot 1250 + 5 \cdot 2160\]\[S_6 = 50 + 400 + 1350 + 3200 + 6250 + 10800\]\[S_6 = 22450\][/tex]
Therefore, the sum of the series [tex]\(\sum_{n=1}^{6} 5 \cdot 10n^3\)[/tex] is 22450.
To estimate the error in using [tex]\(S_4\)[/tex] as an approximation of the sum of the series, we can use the remainder term formula for the integral test. The remainder term [tex]\(R_n\)[/tex]is given by:
[tex]\[R_n = \int_{n+1}^{\infty} f(x) \, dx\][/tex]
In this case, the function f(x) is [tex]\(5 \cdot 10x^3\)[/tex] and n = 4. So, we need to find the integral:
[tex]\[\int_{5}^{\infty} 5 \cdot 10x^3 \, dx\][/tex]
Evaluating the integral:
[tex]\[\int_{5}^{\infty} 5 \cdot 10x^3 \, dx = \left[ \frac{5 \cdot 10}{4}x^4 \right]_{5}^{\infty}\][/tex]
Since the upper limit is infinity, the integral diverges. Therefore, the error in using [tex]\(S_4\)[/tex] as an approximation of the sum of the series is infinite.
Lastly, using n = 4 and the fact that the series is a decreasing series, we can determine bounds on the sum of the series:
[tex]\[S_4 + \int_{4+1}^{\infty} 5 \cdot 10x^3 \, dx < S < S_4 + \int_{4+1}^{4+2} 5 \cdot 10x^3 \, dx\][/tex]
Simplifying:
[tex]\[S_4 + \int_{5}^{\infty} 5 \cdot 10x^3 \, dx < S < S_4 + \int_{5}^{6} 5 \cdot 10x^3 \, dx\][/tex]
Substituting the integral values:
[tex]\[S_4 + \left[ \frac{5 \cdot 10}{4}x^4 \right]_{5}^{\infty} < S < S_4 + \left[ \frac{5 \cdot 10}{4}x^4 \right]_{5}^{6}\][/tex]
Since the integral from 5 to infinity diverges, we have:
[tex]\[S_4 + \text{divergent} < S < S_4 + \left[ \frac{5 \cdot 10}{4}(6^4 - 5^4) \right]\][/tex]
Therefore, the bounds for the sum of the series are [tex]\(S_4 + \text{divergent}\) and \(S_4 + \left[ \frac{5 \cdot 10}{4}(6^4 - 5^4) \right]\).[/tex]
Thereforre, the results can be expressed as follows:
The sum of the series is 22450.
The error in using [tex]\(S_4\)[/tex] as an approximation of the sum of the series is infinite.
The bounds for the sum of the series are[tex]\(S_4 + \text{divergent}\) and \(S_4 + \left[ \frac{5 \cdot 10}{4}(6^4 - 5^4) \right]\).[/tex]
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Find the most general antiderivative of the function
f(x) =
x5 − x3 + 6x
x4
Find the most general antiderivative of the function. (Check your answer by differentiation. Use C for the constant of the antiderivative.)
f(x) = 5
x
+ 3 cos(x)
Find the most general antiderivative of the function. (Check your answer by differentiation. Use C for the constant of the antiderivative.)
f(x) = 2ex − 9 cosh(x)
Find the most general antiderivative of the function. (Check your answer by differentiation. Use C for the constant of the antiderivative.)
g(t) =
7 + t + t2
The most general antiderivative of f(x) = x^5 - x^3 + 6x is (1/6)x^6 - (1/4)x^4 + 3/2x^2 + C. The antiderivative of f(x) = 5x + 3cos(x) is (5/2)x^2 + 3sin(x) + C. The antiderivative of f(x) = 2ex - 9cosh(x) is 2ex - 9sinh(x) + C. The antiderivative of g(t) = 7 + t + t^2 is 7t + (1/2)t^2 + (1/3)t^3 + C.
The most general antiderivative of the function f(x) = x^5 - x^3 + 6x is F(x) = (1/6)x^6 - (1/4)x^4 + 3/2x^2 + C, where C is the constant of integration. To verify this antiderivative, we can differentiate F(x) and check if it equals f(x). Differentiating F(x) gives us f(x) = 6x^5 - 4x^3 + 3x, which matches the original function, confirming that F(x) is indeed the antiderivative of f(x). The most general antiderivative of the function f(x) = 5x + 3cos(x) is F(x) = (5/2)x^2 + 3sin(x) + C, where C is the constant of integration. To check if F(x) is the correct antiderivative, we can differentiate it and see if it matches the original function.
Differentiating F(x) gives us f(x) = 5x + 3cos(x), which is the same as the original function, confirming that F(x) is the antiderivative of f(x). The most general antiderivative of the function f(x) = 2ex - 9cosh(x) is F(x) = 2ex - 9sinh(x) + C, where C is the constant of integration. To verify this antiderivative, we can differentiate F(x) and see if it equals f(x). Differentiating F(x) gives us f(x) = 2ex - 9cosh(x), which matches the original function, confirming that F(x) is the antiderivative of f(x). The most general antiderivative of the function g(t) = 7 + t + t^2 is G(t) = 7t + (1/2)t^2 + (1/3)t^3 + C, where C is the constant of integration. We can check if G(t) is the correct antiderivative by differentiating it and verifying if it matches the original function. Differentiating G(t) gives us g(t) = 7 + t + t^2, which is the same as the original function, confirming that G(t) is the antiderivative of g(t).
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Given f(x, y) = x6 + 6xy3 – 3y4, find = fr(x, y) = fy(x,y) - =
[tex]f_xy(x, y) = 18x^5 + 18y^2[/tex] derivatives represent the rates of change of the function f(x, y) with respect to x and y, as well as the second-order rates of change.
[tex]f_x(x, y) = 6x^5 + 6y^3[/tex]
[tex]f_y(x, y) = 18xy^2 - 12y^3[/tex]
[tex]f_xx(x, y) = 30x^4[/tex]
[tex]f_yy(x, y) = 36xy - 36y^2[/tex]
[tex]f_xy(x, y) = 18x^5 + 18y^2[/tex]
To find the partial derivatives of the function[tex]f(x, y) = x^6 + 6xy^3 - 3y^4,[/tex]we differentiate the function with respect to x and y separately.
First, let's find the partial derivative with respect to x, denoted as ∂f/∂x or f_x:
f_x(x, y) = ∂/∂x[tex](x^6 + 6xy^3 - 3y^4)[/tex]
= [tex]6x^5 + 6y^3[/tex]
Next, let's find the partial derivative with respect to y, denoted as ∂f/∂y or f_y:
f_y(x, y) = ∂/∂y ([tex](x^6 + 6xy^3 - 3y^4)[/tex])
=[tex]18xy^2 - 12y^3[/tex]
Finally, let's find the second partial derivatives:
f_xx(x, y) = ∂²/∂x² ([tex]x^6 + 6xy^3 - 3y^4[/tex])
= ∂/∂x ([tex]6x^5 + 6y^3[/tex])
= [tex]30x^4[/tex]
f_yy(x, y) = ∂²/∂y² ([tex]x^6 + 6xy^3 - 3y^4[/tex])
= ∂/∂y (1[tex]18xy^2 - 12y^3[/tex])
= 36xy - 36y^2
Now, we can find the mixed partial derivative:
f_xy(x, y) = ∂²/∂y∂x [tex]x^6 + 6xy^3 - 3y^4[/tex])
= ∂/∂y ([tex]6x^5 + 6y^3)[/tex])
= [tex]18x^5 + 18y^2[/tex]
In summary:
[tex]f_x(x, y) = 6x^5 + 6y^3[/tex]
[tex]f_y(x, y) = 18xy^2 - 12y^3[/tex]
[tex]f_xx(x, y) = 30x^4[/tex]
[tex]f_yy(x, y) = 36xy - 36y^2[/tex]
[tex]f_xy(x, y) = 18x^5 + 18y^2[/tex]
These derivatives represent the rates of change of the function f(x, y) with respect to x and y, as well as the second-order rates of change.
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Given the parametric equations below, eliminate the parameter t to obtain an equation for y as a function of x fa(t) = 7√t y(t) = 2t +3 y(x) =
By algebra properties, the Cartesian form of the set of parametric equations is y(x) = (2 / 49) · x² + 3.
How to find the Cartesian form of a set of parametric equations
In this problem we find two parametric equations related to two variables {x, y}, from which we need to find its Cartesian form, that is, to find an equation of variable y as a function of variable x by eliminating parameter t. This can be done by algebra properties. First, write the entire set of parametric equations:
x(t) = 7√t, y(t) = 2 · t + 3
Second, clear parameter t as a function of y:
t = (y - 3) / 2
Third, substitute on the first expression:
x = 7 · √[(y - 3) / 2]
Fourth, clear y by algebra properties:
x² = 49 · (y - 3) / 2
(2 / 49) · x² = y - 3
y(x) = (2 / 49) · x² + 3
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Find the indefinite integral. (Remember to use absolute values where appropriate. Use for the constant of integration) | Cacax mtan(2x)+ c
The indefinite integral of |cosec(x) tan(2x)| dx is |cosec(x)| + C.
To find the indefinite integral of |cosec(x) tan(2x)| dx, we can split the absolute value into two cases based on the sign of cosec(x).Case 1: If cosec(x) > 0, then the integral becomes ∫(cosec(x) tan(2x)) dx. By using the substitution u = cos(x), du = -sin(x) dx, we can rewrite the integral as ∫(-du/tan(2x)). The integral of -du/tan(2x) can be evaluated using the substitution v = 2x, dv = 2dx. Substituting these values, we get -∫(du/tan(v)) = -ln|sec(v)| + C = -ln|sec(2x)| + C.Case 2: If cosec(x) < 0, then the integral becomes ∫(-cosec(x) tan(2x)) dx.
By using the substitution u = -cos(x), du = sin(x) dx, we can rewrite the integral as ∫(du/tan(2x)). Using the same substitution v = 2x, dv = 2dx, we get ∫(du/tan(v)) = ln|sec(v)| + C = ln|sec(2x)| + C.Combining the results from both cases, the indefinite integral of |cosec(x) tan(2x)| dx is |cosec(x)| + C, where C is the constant of integration.
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On a separate piece of paper, sketch a unit circle with angle 0 in standard position. Use the circle to answer the
following questions:
a. For what values of 0 is the sine increasing? Decreasing?
b. For what values of 0 is the cosine increasing? Decreasing?
c. For which angle between 0° and 360° is sine equal to 0?
Where is cosine equal to 0?
a. Increasing- 0° and 90° (quadrant I) and 270° and 360° (quadrant IV). Decreasing- 90° and 270° (quadrants II and III).
b. Increasing- 0° and 90° (quadrant I) and 180° and 270° (quadrant III). Decreasing- 90° and 180° (quadrant II) and 270° and 360° (quadrant IV).
c. Sine- 0°, 180°, and 360°. Cosine- 90° and 270°
The sine function represents the vertical coordinate of points on the unit circle, while the cosine function represents the horizontal coordinate. For the sine function, as we move counterclockwise from 0° to 90°, the y-coordinate increases, hence sine increases. From 90° to 270°, the y-coordinate decreases, resulting in a decreasing sine.
Finally, from 270° to 360°, the y-coordinate increases again. Similarly, for the cosine function, as we move counterclockwise from 0° to 90°, the x-coordinate increases, hence cosine increases. From 90° to 180°, the x-coordinate decreases, resulting in a decreasing cosine.
Finally, from 180° to 270°, the x-coordinate decreases again. Sine is equal to 0 at 0°, 180°, and 360° because those angles correspond to the y-coordinate being 0 on the unit circle. Cosine is equal to 0 at 90° and 270° because those angles correspond to the x-coordinate being 0 on the unit circle.
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A hyperbola with a vertical transverse axis contains one endpoint at (4,5). The equations of the asymptotes are y - x = 0 and y + x = 8. Write the equation for the hyperbola.
The equation of the hyperbola with a vertical transverse axis, one endpoint at (4,5), and asymptotes y - x = 0 and y + x = 8 is (x-4)^2/9 - (y-5)^2/16 = 1.
Given that the hyperbola has a vertical transverse axis, we can use the standard form equation for a hyperbola with a vertical transverse axis:
(x-h)^2/a^2 - (y-k)^2/b^2 = 1
where (h, k) represents the coordinates of the center of the hyperbola.
Since the asymptotes are y - x = 0 and y + x = 8, we can rewrite them in slope-intercept form:
y = x and y = -x + 8.
The center of the hyperbola lies at the intersection of the asymptotes, which is (4, 4) (solving the system of equations y = x and y + x = 8).
Now, we can determine the values of a and b by considering the distance between the center (4, 4) and the endpoint (4, 5). The distance between these points is the value of a.
Using the distance formula:
a = sqrt((4-4)^2 + (5-4)^2) = 1
To determine the value of b, we consider the distance from the center (4, 4) to the asymptotes. The distance from the center to an asymptote is the value of b.
Using the distance formula and the equation y = x (one of the asymptotes):
b = sqrt((4-0)^2 + (4-0)^2)/sqrt(2) = 4sqrt(2)
Therefore, the equation of the hyperbola is (x-4)^2/9 - (y-5)^2/16 = 1.
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(95 marks) To help find the velocity of particles requires the evaluation of the indefinite integral of the acceleration function, a(t), i.e. = fa(t) dt. Evaluate the following indefinite integrals. Check your value for each integral by differentiating your answer. (a) [2t 2t (45 cos 3t+16e-4t - 8 sin 2t) dt; (16 marks) (b) √ (32t³ – 12t) (In t)² dt; (26 marks) 5t5 +4e-3t+ 2 sin 6t (c) J (18 marks) √5t6-8e-3t-2 cos 6t+42 4-e-t (d) √ (e^² + 1) (e^² + 2) dt. (35 marks) V = dt;
These indefinite integrals can be checked by differentiating the obtained results to see if they match the original functions.
(a) To evaluate the indefinite integral ∫[2t,2t] (45cos(3t) + 16[tex]e^(-4t)[/tex] - 8sin(2t)) dt, we integrate term by term. The integral of 45cos(3t) is (45/3)sin(3t), the integral of 16[tex]e^(-4t)[/tex] is (-4)[tex]e^(-4t)[/tex], and the integral of -8sin(2t) is (-8/2)cos(2t). Combining these results, we get (15sin(3t) - 4[tex]e^(-4t)[/tex] + 4cos(2t)) + C, where C is the constant of integration.
(b) To evaluate the indefinite integral ∫√(32t³ - 12t)(ln(t))² dt, we use the substitution u = √(32t³ - 12t). This leads to du = (32√t - 6)/√(32t³ - 12t) dt. Substituting back, the integral becomes ∫(ln(t))²(32√t - 6) du. Expanding the integrand and integrating term by term, we get (32/5)(√(32t³ - 12t)ln(t))³ - (6/5)(√(32t³ - 12t)ln(t))² + C, where C is the constant of integration.
(c) To evaluate the indefinite integral ∫(5t⁵ + 4[tex]e^(-3t)[/tex] + 2sin(6t)) dt, we integrate each term separately. The integral of 5t⁵ is (5/6)t⁶, the integral of 4[tex]e^(-3t)[/tex] is (-4/3)[tex]e^(-3t)[/tex], and the integral of 2sin(6t) is (-2/6)cos(6t). Combining these results, we get (5/6)t⁶ - (4/3)[tex]e^(-3t)[/tex] - (1/3)cos(6t) + C, where C is the constant of integration.
(d) To evaluate the indefinite integral ∫√(5t⁶ - 8[tex]e^(-3t)[/tex] - 2cos(6t) + 42/(4 - [tex]e^(-t)[/tex])) dt, there is no elementary antiderivative for this expression. Therefore, we need to use numerical methods or approximations to find the integral value.
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