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1. For which of the following does. A) y = x 3 B) y = x 2 C) y = sin x D) y = e x. 2. f(x) = f(-x). A) y = ln x B) y = sin x C) y = tan x D) y = cos x. 3. Which function has an inverse?. A) y = sin x B) y = ln x C) y = x 2 D). 4. The domain for y = e x+ 1.
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1. For which of the following does • A) y = x3 • B) y = x2 • C) y = sin x • D) y = ex
2. f(x) = f(-x) • A) y = ln x • B) y = sin x • C) y = tan x • D) y = cos x
3. Which function has an inverse? • A) y = sin x • B) y = ln x • C) y = x2 • D)
4. The domain for y = ex+1 • A) • B) • C) x > 0 • D) all real numbers
5. The domain for y = ln(x + 2) – 3 • A) x > 2 • B) x > -3 • C) All real numbers • D)
6. Simplify • A) cannot be simplified • B) –2 • C) –1 • D) ½
7. Find the inverse of y = (x+2)2 –3 • A) • B) • C) • D) Doesn’t have an inverse
9. • A) ½ • B) – ½ • C) • D) -
10. Which graph has an asymptote at x = 2 • A) y = ln (x – 2) • B) y = ln (x + 2) • C) y = ex - 2 • D) y = ex + 2
11. If f(x) = 3x + 2 and g(x) = -x + 4, find f(g(x)) • A) 2x + 6 • B) -3x + 2 • C) -3x + 14 • D) -3x2 + 10x + 8
8. Which function is guaranteed to have an inverse • A) one that is periodic • B) one that is odd • C) one that is continuous • D) One whose derivative is always negative
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f ‘ Where is f increasing?
f ‘ Where is f “ negative?
f ‘ Where are inflection points on f
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F E G A D C B Where is f ‘ positive, f “ negative?
F E G A D C B Where is f ‘ = 0, f “ positive?
F E G A D C B f ’ and f “ negative
F E G A D C B f ‘ positive, f “ = 0
If the derivative of f is always greater than the derivative of g, how many times will the graphs of f and g intersect?
What are the requirements of a function to be continuous at a point?
If a function is differentiable then it is continuous.True or False
Where does y = x3 + 6x2 – 4x + 7 have a point of inflection?
