Calculus Exam Review

Limits

Derivatives

Derivatives II

Misc.

100

the limit as x approaches -5 of

(2x+10)/(x²+2x-15)

-1/4

100

Find the derivative of:

f(x)= pi^2 +e^3 -4

100

If x²+xy-y=2, find dy/dx

(-2x-y)/(x-1)

(2x+y)/(1-x)

100

The following are two conditions for continuity:

A. f(a) is defined

B. the limit as x approaches a of f(x) exists

What is the third condition?

What is the limit as x approaches a of f(x) equals f(a)

200

The definition of a derivative in limit notation

What is the limit as x ->a of (f(x)-f(a))/(x-a)

the limit as h->0 of (f(x+h)-f(x))/h

200

If y=(x³+1)², then dy/dx=

6x²(x³+1)

200

If f(x)=sin²(3-x) then f'(0)=? Your answer can be left in terms of sin and cos.

-2sin3cos3

200

If the graph of f'''(x) of some function f is a line of slope 2, then f'(x) could be what type of function?

A cubic function

300

True/False: If f(a) is undefined, then the limit as x approaches a will also be undefined.

False: Not Necessarily

300

If f(x)=cos(3x), then f'(pi/3)=

300

The circumference of a circle is increasing at a rate of (2pi)/5 inches per minute. When the radius is 5 inches, how fast is the area of the circle increasing in square inches per minute?

2pi

300

The Mean Value Theorem (state it)

A function that is continuous and differentiable on (a,b) then there exists a number c such that

f'(c)=(f(b)-f(a))/(b-a)

400

If the limit as x approaches infinity of

6x²/(200-kx-kx²) = 2/3, then k=

-9

400

If f(9)=3 and f'(9)=-2, find the derivative of x²f(x²) at x=3

-90

400

A conical tank has a height that is always 3 times its radius. If water is leaving the tank at a rate of 50 cubic feet per minute, how fast is the water level falling in feet per minute when the water is 3 feet high?

v=(1/3)pi r^2 h0

50/pi or about 15.915

400

f(x)={x+2 if x is less than or equal to 3; 4x-7 if x>3}

Which are true?

I. the limit as x approaches 3 of f(x) exists

II. f is continuous at x=3

III. f is differentiable at x=3

I and II