1. Exam 1 Math 1231: Single-Variable Calculus

2. Question 1: Limits

3. Question 2: Implicit Function 1. Prove there is a root for the equation cosθ=θ in the interval (0, π). Define f(θ)=cosθ-θ, f(0)=1, f(π)=-1-π, f(θ) have opposite sign on the boundary points, IVP implies there is a root. 2. Prove there is a root for the equation cosy=y in the interval (0, π). Define f(y)=cosy-y, f(0)=1, f(π)=-1-π, f(y) have opposite sign on the boundary points, IVP implies there is a root. 3. Prove there is a root for the equation cosx=x in the interval (0, π). Define f(x)=cosx-x, f(0)=1, f(π)=-1-π, f(x) have opposite sign on the boundary points, IVP implies there is a root. Prove there is a root for the equation sqrt(y)=-1+y in the interval (0, 4). Define f(y)=sqrt(y)+1-y, f(0)=1, f(4)=-1, f(y) have opposite sign on the boundary points, IVP implies there is a root.

4. Question 2: Implicit Function Use parenthesis!!!

5. Question 2: Implicit Function

9. Question 3: Continuity and Derivative f(x) is continuous only if lim x  0 f(x)=f(0)=0. How to show that lim x  0 x 2 sin(1/x) =0?

10. Question 3: Continuity and Derivative Squeeze theorem

11. Question 3: Continuity and Derivative f(x) is continuous only if lim x  0 f(x)=f(0)=0. How to show that lim x  0 x 2 sin(1/x) =0? -1 <= sin(1/x) <= 1  -x 2 <= x 2 sin(1/x) <= x 2. Note that -x 2 and x 2 approach 0 as x goes to 0, so does x 2 sin(1/x).

12. Question 3: Continuity and Derivative

13. Question 4: Derivative Rules

14. Question 5: Related Rates