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Find g'(x) given that g(x) = x^3 cos(πx)​

User Swathy Krishnan
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2 Answers

27 votes
27 votes

Answer:


3x^2 cos (\pi x)-\pi x ^3sin(\pi x)

Explanation:

Product rule, noticing that the second function is composed.
g'(x) = (3x^2)\cdot cos(\pi x) + (x^3) \cdot [-\pi sin(\pi x)] = 3x^2 cos (\pi x)-\pi x ^3sin(\pi x)

User Ravisha Hesh
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3.0k points
23 votes
23 votes

Hello!

We can use the product rule to differentiate this function.

Let g(x) = f(x) · h(x).

Recall the following:

(dy)/(dx) f(x) * h(x) = f'(x)h(x) + h'(x)f(x)

In this instance, let:

f(x) = x^3\\\\h(x) = cos(\pi x)

Differentiate each.

f(x):

Use the product rule:

(dy)/(dx)x^n = nx^(n-1)\\\\f'(x) = 3x^(3-1) = 3x^2

h(x):
Use the chain rule.


h'(x) = \pi (1) * -sin(\pi x) = -\pi sin(\pi x)

Now, we can use the above product rule.


g'(x) = 3x^2 * cos(\pi x) + (-\pi sin(\pi x) * x^3)\\\\\boxed{g'(x) = 3x^2cos(\pi x) - \pi x^3 sin(\pi x)}

User Kudos
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3.0k points