Final answer:
To find the derivative of g(x) = (3 + 5x)⁵(3 - x⁴), we can apply the product rule and the chain rule.
Step-by-step explanation:
To find the derivative of g(x) = (3 + 5x)⁵(3 - x⁴), we can use the product rule and the chain rule.
First, let's find the derivative of (3 + 5x)⁵:
- Let u = 3 + 5x
- Now, apply the chain rule: (d/dx) (u⁵) = 5u⁴ (du/dx)
- Substituting u back, we have: 5(3 + 5x)⁴(5)
Next, let's find the derivative of (3 - x⁴):
- The derivative of 3 is 0
- The derivative of -x⁴ is -4x³
Finally, we multiply these derivatives together:
g'(x) = (5(3 + 5x)⁴)(5) + 0(3 - x⁴) + (3 + 5x)⁵(-4x³)