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प्रश्न
If 5 tan θ = 4, show that `(5 sin θ - 3 cos θ)/(5 sin θ + 2 cos θ) = 1/6`.
योग
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उत्तर
Given: 5 tan θ = 4, show that `(5 sin θ - 3 cos θ)/(5 sin θ + 2 cos θ) = 1/6`.
Step-wise calculation:
1. From 5 tan θ = 4, tan θ = `4/5`.
2. Take a right triangle with opposite = 4, adjacent = 5.
So, hypotenuse = `sqrt(4^2 + 5^2) = sqrt(41)`.
Hence, `sin θ = 4/sqrt(41)` and `cos θ = 5/sqrt(41)`.
3. Compute numerator:
5 sin θ – 3 cos θ
= `5 xx (4/sqrt(41)) - 3 xx (5/sqrt(41))`
= `(20 - 15)/sqrt(41)`
= `5/sqrt(41)`
4. Compute denominator:
5 sin θ + 2 cos θ
= `5 xx (4/sqrt(41)) + 2 xx (5/sqrt(41))`
= `(20 + 10)/sqrt(41)`
= `30/sqrt(41)`
5. Ratio:
`(5/sqrt(41))/(30/sqrt(41))`
= `5/30`
= `1/6`
Therefore, `(5 sin θ - 3 cos θ)/(5 sin θ + 2 cos θ) = 1/6`, as required.
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