Question

दर्शाइए कि  `(cos^2(45^circ + theta) + cos^2(45^circ - theta))/(tan(60^circ + theta) tan(30^circ - theta))` = 1 है।

Answer 1

L.H.S =  `(cos^2(45^circ + theta) + cos^2(45^circ - theta))/(tan(60^circ + theta) * tan(30^circ - theta))` 

= `(cos^2(45^circ + theta) + [sin{90^circ - (45^circ - theta)}]^2)/(tan(60^circ + theta) * cot{90^circ - (30^circ - theta)})`   ...[∵ sin(90° – θ) = cos θ and cot(90° – θ) = tan θ]

= `(cos^2(45^circ + theta) + sin^2(45^circ + theta))/(tan(60^circ + theta) * cot(60^circ + theta))`  ...[∵ sin²θ + cos²θ = 1]

= `1/(tan(60^circ + theta) * 1/(tan(60^circ + theta))`  ...`[∵ cot θ = 1/tanθ]`

= 1

= R.H.S