Advertisements
Advertisements
Question
Prove that `(sin (90^circ - θ))/("cosec" (90^circ - θ)) + (cos (90^circ - θ))/(sec (90^circ - θ)) = 1`.
Advertisements
Solution
Given: Expression: `(sin (90^circ - θ))/("cosec" (90^circ - θ)) + (cos (90^circ - θ))/(sec (90^circ - θ))`
To Prove: The given expression equals 1.
Proof [Step-wise]:
Step 1: Use complementary-angle identities:
sin (90° – θ) = cos θ and cos (90° – θ) = sin θ
Step 2: Use reciprocal identities for the co- and secants:
cosec (90° – θ) = sec θ and sec (90° – θ) = cosec θ
Step 3: Substitute these into the expression:
`sin(90^circ - θ)/("cosec" (90^circ - θ)) + cos(90^circ - θ)/(sec (90^circ - θ))`
= `(cos θ)/(sec θ) + (sin θ)/("cosec" θ)`
Step 4: Replace sec θ and cosec θ by their reciprocals `(sec θ = 1/(cos θ), "cosec" θ = 1/(sin θ))`:
`(cos θ)/(sec θ) = cos θ · cos θ`
= cos2θ
`(sin θ)/("cosec" θ) = sin θ · sin θ`
= sin2θ
Step 5: Add the results:
cos2θ + sin2θ = 1 ...(Pythagorean identity)
Therefore, the original expression equals 1.
