If x=2/3 and x=−3 are the roots of the equation, ax2+7x+b=0, find the values of a and b.

We know that if a and b are the roots of a polynomial, then the polynomial can be given by (X - a)(X - b) = 0. Here, we are given that X = 2/3 and X = -3 are roots of the equation aX² + 7X + b = 0. Therefore, (X - 2/3)(X - (-3)) = 0 ⇒ X² - X(2/3) + 3X - (2/3)(3) = 0 ⇒ X² + X(3 - 2/3) - 2 = 0 ⇒ X² + X(7/3) - 2 = 0 ⇒ 3X² + 7X - 6 = 0 Since this should be equal to the equation aX² + 7X + b = 0, ∴ 3X² + 7X - 6 = aX² + 7X + b By comparing LHS & RHS, we get: 3 = a or a = 3 and -6 = b or b = -6 Therefore, the values are a = 3 and b = -6.

If x=2/3 and x=−3 are the roots of the equation ax2+7x+b=0, find

Q) If X = $\frac{2}{3}$ and X = − 3 are the roots of the equation aX² + 7X + b = 0, find the values of a and b.

Ans: We know that if a and b are the roots of a polynomial, then the polynomial can be given by (X – a) (X – b) = 0

Here, we are given that X = $\frac{2}{3}$ and X = −3 are roots of the equation aX² + 7X + b = 0

∴ (X − $\frac{2}{3}$ ) (X − (−3)) = 0

∴ X² − X $\frac{2}{3}$ + 3 X – ( $\frac{2}{3}$ )(3) = 0

∴ X² + X (3 – $\frac{2}{3}$ ) – 2 = 0

∴ X² + X ( $\frac{7}{3}$ ) – 2 = 0

∴ 3 X² + 7 X – 6 = 0

Since this should be equal to the equation aX² + 7X + b = 0

∴ 3 X² + 7 X – 6 = aX² + 7X + b

By comparing LHS & RHS, we get:

3 = a or a = 3

and – 6 = b or b = − 6

Therefore, values are a = 3 and b = – 6.

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