 Hello and welcome to the session. In this session we will discuss the following question and the question is, so 3x squared minus pi-rex plus 2 is equal to 0. Let's start the solution now. We are given this quadratic equation. So the given quadratic equation is 3x squared minus pi-rex plus 2 is equal to 0. We will solve this quadratic equation by factorizing. For this we will split the middle term. Now the quadratic equation is 3x squared minus pi-rex plus 2 is equal to 0 and the middle term is minus pi-rex. We will split the middle term into three terms such that the product of these two terms is equal to the product of the first and the last term of the given quadratic equation. Now minus pi-rex can be written as minus 3x minus 2x. So we have split minus pi-rex into minus 3x and minus 2x. Now if we see the product of these two terms that is minus 3x into minus 2x this is equal to 6x squared which is equal to 3x squared which is the first term of the quadratic equation into 2 which is the last term of the quadratic equation. So the product of these two middle terms is equal to the product of the first and the last term of the quadratic equation. So the middle term can be split in this way. So this implies the quadratic equation after splitting the middle term becomes 3x squared minus 3x minus 2x into minus 2 is equal to 0. This implies we will take 3x common between the first and the second term. So 3x into x minus 1 the whole. Next we will take minus 2 common between the last two terms. So minus 2 into x minus 1 the whole is equal to 0. This implies 3x minus 2 the whole into x minus 1 the whole is equal to 0. So in this way we have factorized the given quadratic equation into two factors. This implies 3x minus 2 is equal to 0 or x minus 1 is equal to 0. This implies from the first equation we get x is equal to 2 by 3 or from the second equation we get x is equal to 1. So the final answer for the given question is the two roots of the quadratic equation are x is equal to 2 by 3 and x is equal to 1. This is our final answer. With this we end our session. Hope you enjoyed the session.