The product of two consecutive positive integers is 1,332 Explain how you can write and solve a quadratic equation to find the value of the larger integer.

Let x be the smaller of the consecutive positive integers. Consecutive integers are 1 away from each other so the larger integer must be x+1. 
The product of the two consecutive positive integers is then x(x+1) so if the product is 1,332, then x(x+1)=1,332. 
To solve this quadratic equation, first distribute the term with x to get ${\displaystyle x^2+x=1,332.}$ 
Subtracting 1,332 on both sides then gives $x^2+x-1,332=0.$ 
To factor ${\displaystyle x^2+x-1,332=0}$, find two numbers that when multiplied together equal −1,332 since the constant is −1,332 and add to 11 since the middle term has a coefficient of 11. Those two numbers are 37 and −36 since 37(−36)=−1,332 and 37+(−36)=1. 
The factored form of the quadratic equation is then (x+37)(x−36)=0. 
Set each element to 0 and then resolve each linear equation for x.
Setting the first factor equal to 0 gives x+37=0. Subtracting 37 on both sides gives x=−37. The integers must be positive though so the smaller integer cannot be −37. 
Setting the second factor equal to 0 gives x−36=0. Addin 36 on both sides gives x=36. 
The smaller integer is then 36 and the larger integer is x+1=36+1=37.

The numbers can be written as x and x + 1. Set the product of the numbers equal to 1,332 to get x(x + 1) = 1,332. You can solve the quadratic equation by using the quadratic formula, completing the square, or factoring. When you solve the quadratic equation, you find that x = –37 and 36. Since the question asked for positive integers, the only viable solution is x = 36. To solve for the larger integer, you add 1 to 36 to get an answer of 37.