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प्रश्न
If `sin θ = 1/sqrt(2)`, find the values of other t-ratios.
बेरीज
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उत्तर
1. Identify given values
From the definition of sine in a right-angled triangle,
`sin θ = "Perpendicular (P)"/"Hypotenuse (H)"`
Perpendicular (P) = 1
Hypotenuse (H) = `sqrt(2)`
2. Find the adjacent side
Using the Pythagoras theorem (H2 = P2 + B2), we calculate the Base (B):
`(sqrt(2))^2 = (1)^2 + B^2`
2 = 1 + B2
B2 = 1
⇒ B = 1
3. Calculate all t-ratios
Using the values P = 1, B = 1 and H = `sqrt(2)`, we find the remaining ratios:
`cos θ: "Base"/"Hypotensuse"`
= `1/sqrt(2)`
`tan θ: "Perpendicular"/"Base"`
= `1/1`
= 1
`"cosec" θ: 1/(sin θ)`
= `sqrt(2)/1`
= `sqrt(2)`
`sec θ: 1/(cos θ)`
= `sqrt(2)/1`
= `sqrt(2)`
`cot θ: 1/(tan θ)`
= `1/1`
= 1
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Notes
Since `sin θ = 1/sqrt(2)`, the angle θ is 45° (or `π/4` radians).
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