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प्रश्न
If a and b are rational numbers, find the value of a and b:
`a + bsqrt(5) = (4 + 2sqrt(5))/(sqrt(5) + 1) - (4 - 2sqrt(5))/(sqrt(5) - 1)`
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उत्तर
Given: Find rational numbers a and b such that `a + bsqrt(5) = (4 + 2sqrt(5))/(sqrt(5) + 1) - (4 - 2sqrt(5))/(sqrt(5) - 1)`
Stepwise calculation:
1. Rationalize each denominator separately:
`(4 + 2sqrt(5))/(sqrt(5) + 1) xx (sqrt(5) - 1)/(sqrt(5) - 1)`
= `((4 + 2sqrt(5))(sqrt(5) - 1))/((sqrt(5) + 1)(sqrt(5) - 1))`
= `((4 + 2sqrt(5))(sqrt(5) - 1))/(5 - 1)`
= `((4 + 2sqrt(5))(sqrt(5) - 1))/4`
Expand numerator:
`(4)(sqrt(5)) - 4 + 2sqrt(5) xx sqrt(5) - 2sqrt(5)`
= `4sqrt(5) - 4 + 2 xx 5 - 2sqrt(5)`
= `4sqrt(5) - 4 + 10 - 2sqrt(5)`
= `(4sqrt(5) - 2sqrt(5)) + (-4 + 10)`
= `2sqrt(5) + 6`
So, `(4 + 2sqrt(5))/(sqrt(5) + 1)`
= `(2sqrt(5) + 6)/4`
= `6/4 + (2sqrt(5))/4`
= `3/2 + sqrt(5)/2`
2. Similarly for the second term:
`(4 - 2sqrt(5))/(sqrt(5) - 1) xx (sqrt(5) + 1)/(sqrt(5) + 1)`
= `((4 - 2sqrt(5))(sqrt(5) + 1))/((sqrt(5) - 1)(sqrt(5) + 1))`
= `((4 - 2sqrt(5))(sqrt(5) + 1))/(5 - 1)`
= `((4 - 2sqrt(5))(sqrt(5) + 1))/4`
Expand numerator:
`4sqrt(5) + 4 - 2sqrt(5) xx sqrt(5) - 2sqrt(5)`
= `4sqrt(5) + 4 - 2 xx 5 - 2sqrt(5)`
= `4sqrt(5) + 4 - 10 - 2sqrt(5)`
= `(4sqrt(5) - 2sqrt(5)) + (4 - 10)`
= `2sqrt(5) - 6`
So, `(4 - 2sqrt(5))/(sqrt(5) - 1)`
= `(2sqrt(5) - 6)/4`
= `(-6)/4 + (2sqrt(5))/4`
= `-3/2 + sqrt(5)/2`
3. Now subtract the two:
`(3/2 + sqrt(5)/2) - (-3/2 + sqrt(5)/2)`
= `3/2 + sqrt(5)/2 + 3/2 - sqrt(5)/2`
= `3/2 + 3/2 + (sqrt(5)/2 - sqrt(5)/2)`
= 3 + 0
= 3
`a + bsqrt(5) = 3`
Since `3 = 3 + 0 xx sqrt(5)`, we identify a = 3, b = 0.
Hence, the values of a and b are a = 3, b = 0.
