Distributive Property
Explain when to use the distributive property and the process.
When there is a number or a variable next to a parenthesis, you distribute it inside by multiplying it by each term in the parenthesis.
g-14=20
g=34
Solve for y
3-x+y=18
y=x+15
5xy+7yx-17+9-2x+4y
12xy-12-2x+4y
2(3x-7)=6x+14
No solution
-8(3x^2-6x-4)
-24x^2+48x+32
4(c+3)=21+2c
c=9
Solve for L.
P=2L+2W
L=P/2-W
4x+5y-16xy+20y-18x
-14x+25y-16xy
19y-9=8y+13
y=2
Use the distributive property to simplify the expression
3x(8x-7+4y)
24x^2-21x+12xy
What is the solution?
8(d-4)=2(5+4d)
No Solution
Empty Set
Solve for t
d=r/t
t=r/d
7x(9x-3)+4x^2+3x-16+3
67x^2-18x-13
Caedin makes $81 in a 9 hour shift. His pay is directly proportional to the number of hours he works. How much would he make in a 7 hour shift?
$63
Simplify:
-8(4x-6)
-32x+48
What value makes the equation true?
5p+9=4p-18
p=-27
Which of the following is equivalent to:
-6x-7y=7
y=-6/7x+1
y=6/7x-1
y=-6/7x-1
y=6/7x+1
y=-6/7x-1
6x(2x-3+8y)-3x^2+4x-2y
9x^2-14x+48xy-2y
If we get to the end of solving an equation, and you get 9=-9, you know that-
A. There is infinitely many solutions
B. There is no solution
C. There is one solution
B. There is no solution
Evaluate:
-4x(x-5)
-4x^2+20x
What is the solution?
1/3(6x+18)=22
x=8
Solve for y
-4y=-8x+72
y=2x-18
Simplify:
3x^2+(8x-6x^2)+7-(3x+4)
-3x^2+5x+3
A. It has infinitely many solutions
B. No solution
C. One Solution
A. It has infinitely many solutions