(Find LCM of) : ax² - (a² + ab)x+ a²b, bx² - (b² + bc)x+ b²c and cx² - (c² + ac)x + c²a

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asked Feb 27, 2023 59.6k views

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Thompsongunner · Answer 1 · 2023-03-04T00:55:12+0000

Answer:

Here is answer

Explanation:

To find the least common multiple (LCM) of three polynomials, we need to find the smallest polynomial that is divisible by all three of them.

Let's start by factoring each of the given polynomials:

ax² - (a² + ab)x+ a²b = a(x - b)x

bx² - (b² + bc)x+ b²c = b(x - c)x

cx² - (c² + ac)x + c²a = c(x - a)x

The LCM of these three polynomials is the smallest polynomial that is divisible by all three of them. In this case, the smallest such polynomial is (x - a)(x - b)(x - c)x. This is because it is divisible by each of the given polynomials and no smaller polynomial is divisible by all three of them.

Therefore, the LCM of the given polynomials is (x - a)(x - b)(x - c)x.

(Find LCM of) : ax² - (a² + ab)x+ a²b, bx² - (b² + bc)x+ b²c and cx² - (c² + ac)x + c²a

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(Find LCM of) : ax² - (a² + ab)x+ a²b, bx² - (b² + bc)x+ b²c and cx² - (c² + ac)x + c²a​

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(Find LCM of) : ax² - (a² + ab)x+ a²b, bx² - (b² + bc)x+ b²c and cx² - (c² + ac)x + c²a