Suppose that functions ƒ(x) and g(x) and their first derivatives have the following values at x = 0 and x = 1.


x ƒ(x) g(x) ƒ'(x) g'(x)
0 1 1 -3 1/2
1 3 5 1/2 -4


Find the first derivatives of the following combinations at the given value of x.


d. ƒ(g(x)), x = 0

The Chain Rule is a fundamental theorem in calculus used to differentiate composite functions. It states that if you have a function ƒ(g(x)), the derivative can be found by multiplying the derivative of the outer function ƒ with the derivative of the inner function g. This rule is essential for solving problems involving nested functions, as it allows for the systematic calculation of derivatives.

Understanding function values and their derivatives at specific points is crucial for applying calculus concepts. In this context, we need to evaluate ƒ(g(0)) and then find the derivative of that composition. The values of ƒ and g at x = 0, along with their derivatives, provide the necessary information to compute the derivative of the composite function using the Chain Rule.

Evaluating derivatives at specific points involves substituting the given x-value into the derivative expression. In this case, after applying the Chain Rule, we will need to evaluate the resulting expression at x = 0. This step is critical for obtaining the final numerical result, as it translates the abstract derivative into a concrete value that reflects the behavior of the function at that point.