= . This simplifies to f′(x) = = . Nowwe can cancel the factor h in the numerator and the denominator to get f′(x) = = . Now we take the limit: f′(x) = .
16. 2 ax + b
We find the derivative of a function, f(x), using the definition of the derivative, which is f′(x) = . Here f(x) = ax^2 + bx + c and f(x + h) = a(x + h)^2 + b(x + h) + c = ax^2 +
2 axh + ah^2 + bx + bh + c.If we now plug these into the definition of the derivative, we get f′(x) = = . This simplifies to f′(x) = . Now we can factor out the h from the numerator and cancel it with the h
in the denominator: f′(x) = = (2ax + ah + b).Now we take the limit to get f′(x) = (2ax + ah + b) = 2ax + b.SOLUTIONS TO PRACTICE PROBLEM SET 4
- 64 x^3 + 16x
First, expand (4x^2 + 1)^2 to get 16x^4 + 8x^2 + 1. Now, use the Power Rule to take the derivative
of each term. The derivative of 16x^4 = 16(4x^3 ) = 64x^3 . The derivative of 8x^2 = 8(2x) = 16x.
The derivative of 1 = 0 (because the derivative of a constant is zero). Therefore, the derivative
is 64x^3 + 16x.- 10 x^9 + 36x^5 + 18x
First, expand (x^5 + 3x)^2 to get x^10 + 6x^6 + 9x^2 . Now, use the Power Rule to take the derivative
of each term. The derivative of x^10 = 10x^9 . The derivative of 6x^6 = 6(6x^5 ) = 36x^5 . The
derivative of 9x^2 = 9(2x) = 18x. Therefore, the derivative is 10x^9 + 36x^5 + 18x.- 77 x^6