What is the equation that special products are written in once solved?
2
ax+bx+c
100
2
(3x+12)
2
9x+72x+144
100
2
(8-m)
2
m-16m+64
100
(2+x) (2-x)
2
-x+4
100
Find the product of 2 (4x-5)using the binomial formula.
2
16x-40x+25
200
True or False: In order to find the product one must subtract the two binomials
False
200
2
(2b+3)
2
4b+12b+9
200
2
(n-11)
2
n-22n+121
200
(4b+1) (4b-1)
2
16b-1
200
Multiply the square 2(x+10) using the binomial formula.
2
x+20x+100
300
To solve a special product one must always
a) add
b)subtract
c) foil
d) divide
c) foil
300
2
(3x+5)
2
9x+30x+25
300
2
(3q-5)
2
9q-30q+25
300
(26c+5) (26c-5)
2
676c-25
300
Foil the two binomials (5x+9) (5x-9)
2
25x-81
400
True or False: In order to find the product of a sum and difference one must FOIL
True
400
2
(g+5h)
2 2
25h+g+10gh
400
2
(2a-6)
2
4a-24a+36
400
(50x+12) (50x-12)
2
2500x-144
400
Solve the binomial 2(ax-b) when a is 7 and b is 2.
2
49x-28x+4
500
When solving for a product of a sum, would it be solved the same as a product of a difference could be determined?(Would it use the same method)
Yes!
500
2
(2x+7y)
2 2
4x+49y+28xy
500
2
(2/5y-4)
2
(4/25y-16/5+16)
500
(21y+17) (21y-17)
2
441y-289
500
Each edge of a block of wood is 2 centimeters more than each edge of a block of copper. Use this information to write an equation modeling the surface area of the wood block and solve. (SA for a cube is (2)6x)