Question

How do you solve `(8z+4)(5z+10)=0`?

Answer 1

To solve this, you can set each set of parenthesis equal to zero.

`8z+4=0` and `5z+10=0`

Solve for `z`

`8z+4=0`

Subtract `4` on both sides of the equation

`8z=-4`

Divide `8` on both sides of the equation

`z=-1/2`

Solve for `z`

`5z+10=0`

Subtract `10` on both sides of the equation

`5z=-10`

Divide both sides of the equation by `5`

`z=-2`

So, the solutions are:

`z=-1/2 and z=-2`

Answer 2

`z=-1/2,z=-2`

Explanation:

`(8z+4)(5z+10)=0`
Zero Product Principle: If `ab=0` then `a=0`, `b=0` OR both equal zero.

Therefore, in terms of a factored polynomial, you would have to assume both have the chance of being equal to 0.

`(8z+4)=0` and `(5z+10)=0`...

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`8z+4=0`
`8z\stackrel{\cancel{-4}}{\cancel{+4}}=0-4`
`8z=-4`
`z=-4/8=-1/2` or `-0.5`

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`5z+10=0`
`5z\stackrel{\cancel{-10}}{\cancel{10}}=0-10`
`5z=-10`
`z=-10/5=-2`

answer
`z=-1/2,z=-2`