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Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE PDF Download

Q. 1. The number of all possible values of q where 0 < θ < π, for which the system of equations (y + z) cos 3θ = (xyz) sin 3θ

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

(xyz) sin 3θ = (y + 2z) cos 3θ  + y sin 3θ

have a solution (x0, y0, z0) with y0 z0 ≠ 0, is (2010)

Ans. Sol.  (3) The given equations are
xyz sin 3θ = ( y+ z ) cos3θ — (1)
xyz sin 3θ = 2 z cos3θ+ 2 y sin3θ — (2)
xyz sin3θ = y + 2z cos3θ+ y sin3θ — (3)

Operating (1) – (2) and (3) – (1), we get
(cos 3θ – 2 sinq )y – (cos 3θ)z = 0

and sin 3θ y + ( cos 3θ)z=0

which is homogeneous system of linear equation. But

y 0,z ≠ 0

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE⇒ cos 3θ = sin3θ

⇒  Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE =  Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

For θ ∈ (0,π) ⇒Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

∴ Three such solutions are possible.

Q. 2. The number of values of q in the interval,Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE such that Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE for n = 0, ±1,±2 and tanθ = cot 5θ as well as sin 2θ = cos 4θ is (2010)

Ans. Sol.  (3) 

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

⇒ cos θ cos 5θ – sin5θ sinθ= 0 ⇒ cos 6θ=0

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Again sin 2θ= cos 4θ= 1 – 2 sin 2

⇒ 2sin2 2θ + sin 2θ –1= 0 ⇒ sin 2θ = –1Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE
 

⇒  Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

So common solutions are Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

∴ Number of solutions = 3.

 

Q. 3. The maximum value of the expression

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Ans. Sol. Let Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

where g (θ) = sin 2θ+ 3 sinθ cos θ+ 5 cos2θ

Clearly f is maximum when g is minimum

Now (θ)  = Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

= 3 + 2cos 2θ + Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE


 

Q. 4. The positive integer value of n > 3 satisfying the equation

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE          (2011)

Ans. (7) 

Sol.   We have, Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE= 2kπ where k ∈ Z

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

( n=Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEnot possible for any integral value of k)

As n > 3, for k = 0, we get n = 7.

 

Q. 5. The number of distinct solutions of the equation

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE in the interval [0, 2π] is  (JEE Adv. 2015)

Ans. (8)  

Sol.  Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE cos22x + cos4x + sin4x + cos6x + sin6x = 2

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEInteger Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE (cos22x – sin22x) = 0 ⇒ cos4x = 0

⇒ 4x = (2n + 1) Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEEor            x = (2n + 1)Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE

For x∈[0, 2π], n can take values 0 to 7

∴ 8 solutions.

The document Integer Answer Type Questions: Trigonometric Functions & Equations | JEE Advanced | 35 Years Chapter wise Previous Year Solved Papers for JEE is a part of the JEE Course 35 Years Chapter wise Previous Year Solved Papers for JEE.
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FAQs on Integer Answer Type Questions: Trigonometric Functions & Equations - JEE Advanced - 35 Years Chapter wise Previous Year Solved Papers for JEE

1. What are the trigonometric functions commonly used in JEE Advanced?
Ans. The trigonometric functions commonly used in JEE Advanced include sine (sin), cosine (cos), tangent (tan), cosecant (csc), secant (sec), and cotangent (cot).
2. How do I solve trigonometric equations in JEE Advanced?
Ans. To solve trigonometric equations in JEE Advanced, you can use various techniques such as applying trigonometric identities, factoring, substitution, or converting the equation into a quadratic equation. It is important to simplify the equation and isolate the trigonometric function before attempting to solve.
3. Can trigonometric functions be negative in JEE Advanced?
Ans. Yes, trigonometric functions can be negative in JEE Advanced. The signs of trigonometric functions depend on the quadrant in which the angle lies. For example, sine and cosecant are positive in the first and second quadrants, while cosine and secant are positive in the first and fourth quadrants.
4. How can I find the values of trigonometric functions for special angles in JEE Advanced?
Ans. In JEE Advanced, you can use the unit circle or trigonometric ratios of special angles (such as 0°, 30°, 45°, 60°, and 90°) to find the values of trigonometric functions. Memorizing the values of sine, cosine, and tangent for these special angles can be helpful in solving trigonometric problems.
5. What are the key properties of trigonometric functions in JEE Advanced?
Ans. Some key properties of trigonometric functions in JEE Advanced include periodicity, even-odd symmetry, and range. Trigonometric functions are periodic with a period of 360° or 2π radians. Sine and tangent functions are odd, while cosine and secant functions are even. The range of sine and cosine functions is [-1, 1], while the range of tangent, cotangent, secant, and cosecant functions is (-∞, ∞).
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