| Composition Of Function | Graphs and Piece wise functions | Absolute Values |
|---|---|---|
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5
Find the FoG of F(X) = 2x -1 and g(x) = x^2 -1
if FoG(2) |
y= -3abs(x)
Use the absolute value function, vertically stretched by a factor of 3, reflected across the x axis
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Null set
Absolute values can be equal to negative numbers
ABS(12x + 5 ) > -12
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Sqrt(4x^2 +9) + 5x +7
Find (f+g) (x) of F(x) = Sqrt(4x^2 +9) g(x) = 5x+7
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USE DESMOS
Sketch The Graph: -7x^2 +2
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(-infinity , 2) U (2, infinity)
What is the solution set for for ABS(1- 1/2x) > 0
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X^6 +10x^3 -3
DandR (-infinity and Infinity)
Find the GoF (X) for F(x) = x^3 and g(x) = x^2 + 10x -3
What is the Domain and range? |
USE DESMOS
Sketch the Graph 1/2ABS(x) - 5
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y = -13, 5
Solve for 6ABS(y+4) -54 = 0
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-12x -6h +8
Find the difference Quotient for:
f(x) = -6x^2 +8x +5 |
Use desmos
Sketch the Graph of 6SQRT(X-6) -1
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6 and -18/5
Solve ABS(5x -5 ) +8 > 32
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g(X) = 11x , f(x) = sqrt(x) + 17
Find functions F and g such that(FoG)(X) =
sqrt(11x) +17 |
Use Desmos
f(x) = x^2 -4 if x <= -2;
4- x^2 if -2< x < 0 4-2x 0 < =x < = 2 2 - .5x^2 x> 2 FIND f(3) |
15 and 75 degrees
The inequality describes the range of monthly average temperatures T in degrees Fahrenheit at a certain location. What is the High and low temperature of this area given the equation.
ABS(T-45) <= 30 |
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