Find the possible value or values of n in the quadratic equation 2n² - 7n + 6 = 0.

Solution:

Given: 2n² - 7n + 6 = 0

By splitting the middle term

2n² - 4n - 3n + 6 = 0

Taking out the common terms

2n(n - 2) - 3(n - 2) = 0

So we get,

(2n - 3)(n - 2) = 0

Here, 2n - 3 = 0 and n - 2 = 0

2n = 3 and n = 2

n = 3/2 and n = 2

Therefore, the values of n are 3/2 and 2.

Find the possible value or values of n in the quadratic equation 2n² - 7n + 6 = 0.

Summary:

The possible value or values of n in the quadratic equation 2n² - 7n + 6 = 0 are 3/2 and 2.