Question

Which of the following equations would have the roots -½ and ⅗?

(2x - ­ 1)(5x + 3) = 0

(1x + 2)(3x ­- 5) = 0

(2x + 1)(5x - ­ 3) = 0

(1x - ­ 2)(3x + 5) = 0

Answer 1

`(2x+1)(5x-3)=0`

Explanation:

If `-1/2` is a root then one factor is `x-(-1/2)` i.e. `x+1/2` or `(2x+1)/2`

and if `3/5` is a root then one factor is `x-3/5` i.e. `(5x-3)/5`

Hence correct answer is `(2x+1)(5x-3)=0` as

`((2x+1)/2)((5x-3)/5)=0hArr(2x+1)(5x-3)=0`

Answer 2

`(2x+1)(5x-3)`

Explanation:

`"equate each factor in the product on the left to zero and"`
`"solve for x"`

`(2x-1)(5x+3)=0`

`2x-1=0rArrx=1/2`

`5x+3=0rArrx=-3/5`

`"and so on until "`

`(2x+1)(5x-3)=0`

`2x+1=0rArrx=-1/2`

`5x-3=0rArrx=3/5`

`rArr(2x+1)(5x-3)=0" is the equation"`