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Complete the table for the function and find the indicated limit. Lim x^3-6x+8/x-2 x-0 x]-0.1| -0.01,|-0.001|0.1 F(x)= 4.09476; 4.00995; 4.00100;...
F(x)=
4.09476; 4.00995; 4.00100; 3.99900; 3.98995; 3.89526 limit = 4.0
-2.18529; -2.10895; -2.10090; -2.09910; -2.09096; -2.00574 limit = -2.10
-1.22843; -1.20298; -1.20030; -1.19970; -1.19699; -1.16858 limit = -1.20
-4.09476; -4.00995; -4.00100; -3.99900; -3.98995; -3.89526 limit = -4.0
2.
Lim 5
x->2
-5
5
0
2
4.
1/3
1/12
3
12
5. Use the definition of continuity to determine whether f is continuous at a.
F(X)= x-4/x+5;A=4
not Continuous
Continuous
6.
not Continuous
Continuous
7.
5
None
0
-5, 5
8.
2
-2
-6
6
9.
x | -.03| |-0.02 | -0.01| 0.01 | 0.02 | 0.03|
F(X)|
-0.0300, -0.0200, -0.0100, 0.0100, 0.0200, 0.0300 limit = 0.1
-0.0300, -0.0200, -0.0100, 0.0100, 0.0200, 0.0300 limit = 0
-0.0300, -0.0200, -0.0100, 0.0100, 0.0200, 0.0300 limit = -1
-0.0300, -0.0200, -0.0100, 0.0100, 0.0200, 0.0300 limit = 1
10
Use properties of limits to find the indicated limit. It may be necessary to write an expression before limit properties can be applied.
Lim (2x^2+2x+3)^2
x->
-9
9
does not exist
1
11.Use the definition of continuity to determine whether f is continuous at a.
f(x) = 5x4 - 9x3 + x - 7a = 7
Question 16 options:
Not continuous
Continuous
12.x
Lim F(x)
x->0
1
0
-7
7
13.The function f(x) = x3 describes the volume of a cube, f(x), in cubic inches, whose length, width, and height each measure x inches. If x is changing, find the average rate of change of the volume with respect to x as x changes from 1 inches to 1.1 inches.
Question 18 options:
23.31 cubic inches per inch
2.33 cubic inches per inch
-3.31 cubic inches per inch
3.31 cubic inches per inch
14.Find the derivative of f at x. That is, find f '(x). f(x) = 7x + 8; x = 5
Question 19 options:
40
8
7
35
15.
Find the slope of the tangent line to the graph of f at the given point.
f(x) = x2 + 5x at (4, 36)
Question 20 options:
9
13
3
21
