The transformation of the following equation from the parent function:
g(x)=(x+3)^2
What is 3 units left?
100
The direction that the following parabola opens:
f(x) = -3x^2 + 2x + 5.
What is down?
100
The square root of -12.
What is 2i sqrt(3).
100
They type of the following function (growth or decay):
f(x)=2(.5)^x
What is decay.
200
The test used on a graph to determine if a relation is a function.
What is the vertical line test?
200
The resulting function when f(x)=x^2 is reflected across the x-axis, translated left 5 units and translated up 1 unit.
What is
g(x)=-(x+5)^2 + 1?
200
The minimum or maximum value, the domain and the range of the following function:
f(x) = x^2 - 6x + 3.
What is
min = -6
D: all reals
R: y>= -6
200
The solutions of:
x^2+48=0
What is +/- 4i sqrt(3).
200
Log form of 3^2 = 9
What is log base 3 of 2 =9.
300
The domain and range of the following relation:
(1,5) (7,-3) (-1,-1) (0,0) (-8,5) (-2,5)
What is
D: -8, -2, -1, 0, 1, 7
R: -3, -1, 0, 5
300
The resulting function when f(x)=lxl is compressed horizontally by a factor of 2 and reflected across the x-axis.
What is
g(x)=-l.5xl?
300
Upward or downward, Axis of Symmetry, Vertex, maximum or minimum, and y-intercept of the following function:
f(x) = -2x^2 +8x +5
What is
down
x=2
(2,13)
max=13
5
300
The values of x and y that make the following equation true:
2x-6i = -8+(20y)i.
What is x=-4 and y=-10/3?
300
The inverse of f(x)=5x-7
What is f^-1(x)=(x+7)/5?
400
The value of f(x)=-x^2 + x evaluated for x=3/2.
What is -3/4?
400
The transformations that were performed on the parent function to give the following function:
g(x) = (1/3)(2)^(-x+2) + 3
What is a horizontal compression by 1/3, a reflection across the y-axis, 2 units left and 3 units up?
400
The solutions of:
x^2-10x+25=16
What is x=9 and x=1?
400
The complex conjugate of:
i-5
What is -i-5?
400
Solution of:
log base 2 (3-4x)= log base 2 (x/3)
What is 9/13?
500
The domain and range for the function f(x)=x^3
What is
D: all reals
R: all reals
500
The function that results from the following transformations of f(x)=x^2:
horizontal stretch by 3, reflection across the x-axis, translation 3 units left and translation 4 units down.