Solved on Feb 09, 2024

Find the antiderivative of dsdt=11t(5t27)3\frac{d s}{d t}=11 t\left(5 t^{2}-7\right)^{3}.

STEP 1

Assumptions
1. We are given the derivative of a function s s with respect to t t , which is dsdt=11t(5t27)3 \frac{d s}{d t}=11 t\left(5 t^{2}-7\right)^{3} .
2. We need to find the antiderivative of this function, which is the original function s s .

STEP 2

Recognize that the given derivative is in a form suitable for the reverse chain rule, also known as the substitution method for integration. The reverse chain rule is used when the integrand (the expression we are integrating) is the product of a function and the derivative of an inner function.

STEP 3

Identify the inner function and its derivative. In this case, the inner function is u=5t27 u = 5t^2 - 7 , and its derivative with respect to t t is dudt=10t \frac{du}{dt} = 10t .

STEP 4

Notice that the given derivative dsdt \frac{d s}{d t} contains the term 11t 11t , which is similar to the derivative of the inner function dudt=10t \frac{du}{dt} = 10t , except for the constant factor of 11 11 instead of 10 10 .

STEP 5

Rewrite the derivative dsdt \frac{d s}{d t} in terms of u u by substituting u=5t27 u = 5t^2 - 7 and adjusting the constant factor to account for the difference between 11t 11t and 10t 10t .
dsdt=11t(u)3=111010t(u)3 \frac{d s}{d t} = 11t(u)^3 = \frac{11}{10} \cdot 10t(u)^3

STEP 6

Now, express 10t 10t as dudt \frac{du}{dt} to make the substitution more explicit.
dsdt=1110dudt(u)3 \frac{d s}{d t} = \frac{11}{10} \cdot \frac{du}{dt}(u)^3

STEP 7

Integrate both sides with respect to t t to find the antiderivative s s .
dsdtdt=1110dudt(u)3dt \int \frac{d s}{d t} \, dt = \int \frac{11}{10} \cdot \frac{du}{dt}(u)^3 \, dt

STEP 8

On the left side, the integral of dsdt \frac{d s}{d t} with respect to t t is simply s s , since the derivative of s s with respect to t t is dsdt \frac{d s}{d t} .
s=1110dudt(u)3dt s = \int \frac{11}{10} \cdot \frac{du}{dt}(u)^3 \, dt

STEP 9

Perform the substitution dudtdt=du \frac{du}{dt} \, dt = du on the right side.
s=1110(u)3du s = \int \frac{11}{10} (u)^3 \, du

STEP 10

Integrate 1110(u)3 \frac{11}{10} (u)^3 with respect to u u using the power rule for integration, which states that undu=un+1n+1+C \int u^n \, du = \frac{u^{n+1}}{n+1} + C , where C C is the constant of integration.
s=1110(u)3du s = \frac{11}{10} \int (u)^3 \, du

STEP 11

Apply the power rule to the integral.
s=1110(u)3+13+1+C s = \frac{11}{10} \cdot \frac{(u)^{3+1}}{3+1} + C

STEP 12

Simplify the expression.
s=1110(u)44+C s = \frac{11}{10} \cdot \frac{(u)^4}{4} + C
s=1140(u)4+C s = \frac{11}{40} (u)^4 + C

STEP 13

Substitute back the expression for u u in terms of t t to get s s in terms of t t .
s=1140(5t27)4+C s = \frac{11}{40} (5t^2 - 7)^4 + C
This is the antiderivative of the given derivative.

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