मराठी
महाराष्ट्र राज्य शिक्षण मंडळएस.एस.सी (इंग्रजी माध्यम) इयत्ता १० वी

Show that tan 7° × tan 23° × tan 60° × tan 67° × tan 83° = sqrt(3).

Advertisements
Advertisements

प्रश्न

Show that tan 7° × tan 23° × tan 60° × tan 67° × tan 83° = `sqrt(3)`.

बेरीज
Advertisements

उत्तर

L.H.S. = tan 7° × tan 23° × tan 60° × tan 67° × tan 83°

= tan 7° × tan 23° × `sqrt(3)` × tan (90° – 23°) × tan (90° – 7°)

= `sqrt(3)` × [tan 7° × tan (90° – 7°)] × [tan 23° × tan (90° – 23°)]

= `sqrt(3) xx 1 xx 1`   ...[∵ tan θ × tan (90° – θ) = 1]

= `sqrt(3)`

= R.H.S.

∴ tan 7° × tan 23° × tan 60° × tan 67° × tan 83° = `sqrt(3)`

shaalaa.com
  या प्रश्नात किंवा उत्तरात काही त्रुटी आहे का?
पाठ 6: Trigonometry - Exercise

संबंधित प्रश्‍न

(1 + tan θ + sec θ) (1 + cot θ − cosec θ) = ______.


`(1+tan^2A)/(1+cot^2A)` = ______.


Prove the following trigonometric identities.

`1/(sec A - 1) + 1/(sec A + 1) = 2 cosec A cot A`


Prove the following trigonometric identities.

(sec A + tan A − 1) (sec A − tan A + 1) = 2 tan A


If sin θ + cos θ = x, prove that  `sin^6 theta + cos^6 theta = (4- 3(x^2 - 1)^2)/4`


If m = ` ( cos theta - sin theta ) and n = ( cos theta +  sin theta ) "then show that" sqrt(m/n) + sqrt(n/m) = 2/sqrt(1-tan^2 theta)`.


Write the value of `(1+ tan^2 theta ) ( 1+ sin theta ) ( 1- sin theta)`


If  `sin theta = 1/2 , " write the value of" ( 3 cot^2 theta + 3).`


If tan A =` 5/12` ,  find the value of (sin A+ cos A) sec A.


If cosec θ − cot θ = α, write the value of cosec θ + cot α.


Prove the following identity :

secA(1 + sinA)(secA - tanA) = 1


Prove the following identity :

`(tanθ + secθ - 1)/(tanθ - secθ + 1) = (1 + sinθ)/(cosθ)`


Prove the following identity : 

`(tanθ + 1/cosθ)^2 + (tanθ - 1/cosθ)^2 = 2((1 + sin^2θ)/(1 - sin^2θ))`


If sinA + cosA = `sqrt(2)` , prove that sinAcosA = `1/2`


Prove that: 2(sin6 θ + cos6 θ) – 3 (sin4 θ + cos4 θ) + 1 = 0.


Prove that cosec2 (90° - θ) + cot2 (90° - θ) = 1 + 2 tan2 θ.


Without using the trigonometric table, prove that
tan 10° tan 15° tan 75° tan 80° = 1


Prove that identity:
`(sec A - 1)/(sec A + 1) = (1 - cos A)/(1 + cos A)`


Prove the following identities.

tan4 θ + tan2 θ = sec4 θ – sec2 θ


`1/sin^2θ - 1/cos^2θ - 1/tan^2θ - 1/cot^2θ - 1/sec^2θ - 1/("cosec"^2θ) = -3`, then find the value of θ.


Share
Notifications

Englishहिंदीमराठी


      Forgot password?
Use app×