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प्रश्न
If `1/(2 + sqrt(3)) = a + bsqrt(3)` then a and b respectively are ______.
विकल्प
2, 3
2, 1
2, –1
2, –3
MCQ
रिक्त स्थान भरें
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उत्तर
If `1/(2 + sqrt(3)) = a + bsqrt(3)` then a and b respectively are 2, –1.
Explanation:
We need to simplify:
`1/(2 + sqrt(3))`
Step 1: Rationalize the denominator
Multiply numerator and denominator by the conjugate `2 - sqrt(3)`:
`1/(2 + sqrt(3)) xx (2 - sqrt(3))/(2 - sqrt(3))`
= `(2 - sqrt(3))/((2 + sqrt(3))(2 - sqrt(3))`
Step 2: Simplify denominator
`(2 + sqrt(3))(2 - sqrt(3))`
= `2^2 - (sqrt(3))^2`
= 4 – 3
= 1
So, `1/(2 + sqrt(3)) = 2 - sqrt(3)`
Step 3: Compare with form `a + bsqrt(3)`
Here, `2 - sqrt(3) = a + bsqrt(3)`
Thus, a = 2, b = –1.
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