Number of real solutions of x-22-x2-4-x2-3x-2-0

(x 2)^2+|x^2 4|+√(x^2 3x+2)=0 As we know that (x 2)^2≥0 |x^2 4|≥0 √(x^2 3x+2)≥0 But RHS is 0 it means all three terms will be equal to 0 (x 2)^2=0 x=2 ⋯(1) ...

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Standard XI

Mathematics

Absolute Value Function

Number of rea...

Question

Number of real solutions of $(x - 2)^{2} + | x^{2} - 4 | + \sqrt{x^{2} - 3 x + 2} = 0$

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Solution

$(x - 2)^{2} + | x^{2} - 4 | + \sqrt{x^{2} - 3 x + 2} = 0$
As we know that
$(x - 2)^{2} \geq 0$
$| x^{2} - 4 | \geq 0$
$\sqrt{x^{2} - 3 x + 2} \geq 0$
But RHS is $0$ it means all three terms will be equal to $0$

$(x - 2)^{2} = 0$
$x = 2 \dots (1)$

$| x^{2} - 4 | = 0$
$x^{2} - 4 = 0$
$x = - 2, + 2 \dots (2)$

$\sqrt{x^{2} - 3 x + 2} = 0$
$x^{2} - 3 x + 2 = 0$
$(x - 2) (x - 1) = 0$
$x = 1, 2 \dots (3)$

Now, all three expressions should be $0$ at the same time so,
By set $(1) \cap (2) \cap (3)$
$x = 2$
So, there is only one solution

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Absolute Value Function

Standard XI Mathematics

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Number of real solutions of (x−2)2+|x2−4|+√x2−3x+2=0

Number of real solutions of $(x - 2)^{2} + | x^{2} - 4 | + \sqrt{x^{2} - 3 x + 2} = 0$