Calculus

Front 1

Determine: (x2 + 8x - 2)

Question 1 options:

18

-18

0

does not exist

Front 2

Solve the problem.

Graph the function and use the graph to determine the indicated limit.
f(x) = (x + 3)(x + 2); f(x)

Question 2 options:

1

12

0

does not exist

Front 3

Solve the problem.

Graph the function and use the graph to determine the indicated limit.
f(x) = ; f(x)

Question 3 options:

1

0

does not exist

Front 4

Solve the problem.

Question 4 options:

-1

1

0

does not exist

Front 5

Solve the problem.

Determine:

Question 5 options:

5

-8

0

does not exist

Front 6

Solve the problem.

Determine:

Question 6 options:

4

0

does not exist

Front 7

Solve the problem.

Determine:

Question 7 options:

-5

8

0

does not exist

Front 8

Solve the problem.

Let f(x) = + 5. Determine: .

Question 8 options:

+ 2

0

does not exist

Front 9

Solve the problem.

Use the graph of g to determine: g(x)

Question 9 options:

1

3

0

does not exist

Front 10

Solve the problem.

Use the graph of g to determine: g(x)

Question 10 options:

1

-1

0

does not exist

Front 11

Solve the problem.

Use the graph of f to determine if f is continuous at x = -1.

Question 11 options:

no

yes

Front 12

Solve the problem.

Use the graph of f to determine if f is continuous at x = 1.

Question 12 options:

no

yes

Front 13

Question 13 (1 point)

Solve the problem.

Determine the continuity of the given function at the indicated points.
f(x) = 4x4 - 9x3 + x - 5; x = 5, 0, 9

Question 13 options:

continuous at x = 5, 0; discontinuous at x = 9

continuous at x = 0, 9; discontinuous at x = 5

discontinuous at x = 5, 0, 9

continuous at x = 5, 0, 9

Front 14

Question 14 (1 point)

Solve the problem.

Determine the continuity of the given function at the indicated points.
f(x) = ; x = 8, 0, 9

Question 14 options:

continuous at x = 8, 0; discontinuous at x = 9

continuous at x = 8, 9; discontinuous at x = 0

continuous at x = 0, 9; discontinuous at x = 8

continuous at x = 8, 0, 9