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Practice Test for Linearization and Differentials

1. Find the differential of y=x^3-2x=1

2. Determine the linear approximation for at f(x)=₃√x . Use the linear approximation to approximate the value of ƒ(x)=₃√7.95

3. Determine the linear approximation for at f(x)=₃√x . Use the linear approximation to approximate the value of ƒ(x)=₃√8.05.

4. Find the differential of y=cosx

5. Given f(x)=x^3/4 and a=16, approximate f(15.9) by using differentials.

6. Find the differential of y=e^2x

7. Define the concept of linearization

8. Give step by step directions on how to find the Differential of y formula

9. Estimate the value of √9.021

10. Use differentials to approximate the value of the expression. √99.4

11. Find the linearization approximation of tan(42°) when a=(7π/30)

12. Explain when this formula is used y=f(a)+f’(a)(x-a)

13. (∆y/∆x) is equal to what?