Please select a subject first
Advertisements
Advertisements
If sin θ + sin2 θ = 1 show that: cos2 θ + cos4 θ = 1
Concept: Trigonometric Identities (Square Relations)
sin2θ + sin2(90 – θ) = ?
Concept: Trigonometric Identities (Square Relations)
`(1 - tan^2 45^circ)/(1 + tan^2 45^circ)` = ?
Concept: Trigonometric Identities (Square Relations)
If `tan θ = 9/40`, complete the activity to find the value of sec θ.
Activity:
sec2θ = 1 + `square` ...[Fundamental trigonometric identity]
sec2θ = 1 + `square^2`
sec2θ = 1 + `square`
sec θ = `square`
Concept: Trigonometric Identities (Square Relations)
Prove that `1/("cosec" θ - cot θ) = "cosec" θ + cot θ`.
Concept: Trigonometric Identities (Square Relations)
If cos (45° + x) = sin 30°, then x = ?
Concept: Trigonometric Ratios in Terms of Coordinates of Point
If `tan θ = 7/24`, then to find value of cos θ complete the activity given below.
Activity:
sec2θ = 1 + `square` ...[Fundamental tri. identity]
sec2θ = 1 + `square^2`
sec2θ = 1 + `square/576`
sec2θ = `square/576`
sec θ = `square`
cos θ = `square ...`[cos theta = 1/sectheta]`
Concept: Trigonometric Identities (Square Relations)
Prove that `(sec A)/(tan A + cot A) = sin A`.
Concept: Trigonometric Identities (Square Relations)
Prove that `(cot A)/(1 - tan A) + (tan A)/(1 - cot A) = 1 + tan A + cot A = sec A . "cosec" A + 1`.
Concept: Trigonometric Identities (Square Relations)
The value of 2tan45° – 2sin30° is ______.
Concept: Trigonometric Table
Complete the following activity to prove:
cotθ + tanθ = cosecθ × secθ
Activity: L.H.S. = cotθ + tanθ
= `cosθ/sinθ + square/cosθ`
= `(square + sin^2theta)/(sinθ xx cosθ)`
= `1/(sinθ xx cosθ)` ....... ∵ `square`
= `1/sinθ xx 1/cosθ`
= `square xx secθ`
∴ L.H.S. = R.H.S.
Concept: Trigonometric Identities (Square Relations)
If sinθ = `11/61`, then find the value of cosθ using the trigonometric identity.
Concept: Trigonometric Identities (Square Relations)
Show that: `tan "A"/(1 + tan^2 "A")^2 + cot "A"/(1 + cot^2 "A")^2 = sin"A" xx cos"A"`
Concept: Trigonometric Identities (Square Relations)
In ΔABC, ∠ABC = 90° and ∠ACB = θ. Then write the ratios of sin θ and tan θ from the figure.
Concept: Trigonometric Ratios
Prove that sec θ + tan θ = `cos θ/(1 - sin θ)`.
Proof: L.H.S. = sec θ + tan θ
= `1/square + square/square`
= `square/square` ......`(∵ sec θ = 1/square, tan θ = square/square)`
= `((1 + sin θ) square)/(cos θ square)` ......[Multiplying `square` with the numerator and denominator]
= `(1^2 - square)/(cos θ square)`
= `square/(cos θ square)`
= `cos θ/(1 - sin θ)` = R.H.S.
∴ L.H.S. = R.H.S.
∴ sec θ + tan θ = `cos θ/(1 - sin θ)`
Concept: Trigonometric Ratios
Find the value of sin 0° + cos 0° + tan 0° + sec 0°.
Concept: Trigonometric Ratios
Find the value of sin 45° + cos 45° + tan 45°.
Concept: Trigonometric Ratios
Prove that: (sec θ – cos θ) (cot θ + tan θ) = tan θ.sec θ
Proof: L.H.S. = (sec θ – cos θ) (cot θ + tan θ)
= `(1/square - cos θ) (square/square + square/square)` ......`[∵ sec θ = 1/square, cot θ = square/square and tan θ = square/square]`
= `((1 - square)/square) ((square + square)/(square square))`
= `square/square xx 1/(square square)` ......`[(∵ square + square = 1),(∴ square = 1 - square)]`
= `square/(square square)`
= tan θ.sec θ
= R.H.S.
∴ L.H.S. = R.H.S.
∴ (sec θ – cos θ) (cot θ + tan θ) = tan θ.sec θ
Concept: Angles of Elevation and Depression
What will be the value of sin 45° + `1/sqrt(2)`?
Concept: Trigonometric Ratios
In the given figure, if sin θ = `7/13`, which angle will be θ?
Concept: Trigonometric Ratios
