Multiply/Divide
1/3 * 5/9
5/27
(9)/(10)-(1)/(5)
7/10
This is the name for a line that a function approaches but never actually touches.
What is an asymptote?
Excluded values of a rational expression will make the value of the denominator equal to this number.
What is 0?
Factor:
4x^2+4x
4x(x+1)
What you do when you divide fractions. It might also make you think of chicken
What is “keep change flip”?
What you must have if you want to add or subtract fractions.
What is a Common Denominator?
State the transformations of the rational function: f(x)=-(2)/(x-1)+4
Right 1
Vertically Stretched by 2
Vertically reflected
Up 4
Solve the equation:
(5)/(x)=(7)/(x+2)
x=5
What is the domain restriction given:
(5)/(x)=(7)/(x+2)
x!= 0 or -2
Multiply and simplify:
(6x^2-18x)/(x^2-10x+21)*(x^2-14x+49)/(3x^2)
(2(x-7))/x
Add the rational expressions:
(x+1)/(x^2-9) + (x+7)/(x^2-9)
(2x+8)/(x^2-9)
Write the equations for the vertical and horizontal asymptotes of the following function:
y=(1)/(x-3)-1
VA: x=3
HA: y= -1
(x+4)/(4)+(x-1)/(4)=(x+4)/(4x)
x=-2
x=1
Simplify the rational expression:
(x^2+5x-14)/(x^2-4x+4)
(x+7)/(x-2)
x!=2
{(3x+27)}/{(6x-48)}-:(x^2+9x)/(x^2-4x-32)
(x+4)/(2x)
Subtract the rational expressions:
(4)/(x+4)-(3)/(4)
(4-3x)/{4(x+4)}
Write the equation in reciprocal form: f(x)=(x+3)/(x-2)
y=(5)/(x-2)+1
Solve 1=1/(x^2+2x)+(x-1)/x
x= -1
Factor
2x^2-2
2(x+1)(x-1)
(x+7)/(x+8) *(x^2+x-56)/(x^2-49)
1
(4)/{(3x+3)}+(1)/(x-2)
(7x-5)/((3x+3)(x-2)
Write an equation for a reciprocal function with this info:
VA: x=2
HA: y=8
Point
(-5, 6)
y=14/(x-2)+8
Solve and check for extraneous solutions:
(x+11)/(x^2-5x+4)=5/(x-4)-3/(x-1)
x=4
is extraneous so No Solution
Find the common denominator of the rational expression:
(2p)/(p+6) and 2/(5p-4)
(p+6)(5p-4)