Start by identifying the values of a, b, and c. Be sure that all of the terms are on the same side and in the correct order for the standard form of a quadratic function.
- 2/3, 3/2
To solve the given equation by factoring, we will start by identifying the values of a, b, and c.
6x^2-5x-6=0
⇕
6x^2+( - 5)x+( - 6)=0
We have a quadratic equation with a= 6, b= - 5, and c= - 6. To factor the left-hand side, we need to find a factor pair of 6 * ( - 6)=- 36 whose sum is - 5.
Since - 36 is a negative number, we will only consider factors with opposite signs — one positive and one negative — so that their product is negative.
Factor Pair
Product of Factors
Sum of Factors
1 and - 36
^(1* (- 36)) - 36
1+(- 36) - 35
- 1 and 36
^(- 1* 36) - 36
- 1+36 35
2 and - 18
^(2* (- 18)) - 36
2+(- 18) - 16
- 2 and 18
^(- 2* 18) - 36
- 2+18 16
3 and - 12
^(3* (- 12)) - 36
3+(- 12) - 9
- 3 and 12
^(- 3* 12) - 36
- 3+12 9
4 and - 9
^(4* (- 9)) - 36
4+(- 9) - 5
- 4 and 9
^(- 4* 9) - 36
- 4+9 5
6 and - 6
^(6* (- 6)) - 36
6+(- 6) 0
The integers whose product is - 36 and whose sum is - 5 are 4 and - 9. With this information, we can rewrite the linear factor on the left-hand side of the equation, and factor by grouping.
We found that the solutions to the given equation are x= 32 and x=- 23. To check our answer, we will graph the given function y=6x^2-5x-6 using a calculator.
We can see that the x-intercepts are - 23 and 32. Therefore, the solutions are correct.
