03 త్రికోణమితి విధులు

వ్యాయామం 01

Question:

Find the general solution for cos4x=cos2x A x=nπ or nπ​/6 B x=nπ or nπ​/3 C x=2nπ​/3 D x=π

Answer:

A. x=nπ or nπ/6

Question:

Find the value of cot(−15π​/4)

Answer:

Step 1: Convert -15π/4 into radians.

Radians = -15π/4 = -7π/2

Step 2: Find the cotangent of -7π/2.

cot(-7π/2) = -cot(7π/2)

Step 3: Use the identity cot(x) = -cot(π - x).

-cot(7π/2) = -cot(π - 7π/2)

Step 4: Simplify.

-cot(7π/2) = -cot(π/2 - 7π/2)

Step 5: Use the identity cot(x) = cot(π - x).

-cot(7π/2) = cot(π/2 - 7π/2)

Step 6: Simplify.

-cot(7π/2) = cot(-5π/2)

Step 7: Use the identity cot(x) = -cot(π + x).

-cot(7π/2) = -cot(π + 5π/2)

Step 8: Simplify.

-cot(7π/2) = -cot(3π/2)

Step 9: Find the cotangent of 3π/2.

cot(-15π/4) = -cot(3π/2) = -√3

Question:

Find the degree measure of the angle subtended at the centre of a circle of radius 100 cm by an arc of length 22 cm. (Use π=22​/7)

Answer:

Step 1: Calculate the circumference of the circle using the formula C=2πr C=2π(100) C=200π

Step 2: Calculate the central angle using the formula θ=arc length/radius θ=22/100 θ=0.22

Step 3: Convert the central angle to degree measure using the formula θ (in degree)= θ (in radians) × 180/π θ (in degree)= 0.22 × 180/π θ (in degree)= 12.56°

Question:

In a circle of diameter 40 cm, the length of a chord is 20 cm. Find the length of minor arc of the chord.

Answer:

Step 1: Calculate the radius of the circle.

Radius = Diameter/2 Radius = 40 cm/2 Radius = 20 cm

Step 2: Calculate the length of the arc.

Length of arc = (θ/360) x 2πr

Where, θ is the angle subtended by the arc at the center, r is the radius of the circle.

Step 3: Calculate the angle subtended by the arc at the center.

Angle subtended by the arc = (2 x Length of chord)/Radius Angle subtended by the arc = (2 x 20 cm)/20 cm Angle subtended by the arc = 40°

Step 4: Substitute the values in the formula.

Length of arc = (40/360) x 2πr Length of arc = (40/360) x 2π x 20 cm Length of arc = 17.1 cm

Question:

Find the value of csc(−1410∘)

Answer:

Step 1: Convert the angle from degrees to radians.

−1410∘ = −1410∘ × (π/180) = −24.7π radians

Step 2: Find the value of csc(−1410∘) using the cosecant function.

csc(−1410∘) = 1/sin(−24.7π)

Step 3: Calculate the value of sin(−24.7π).

sin(−24.7π) = -1

Step 4: Calculate the value of csc(−1410∘).

csc(−1410∘) = 1/(-1) = -1

Question:

Find the value of sin(−11π​/3)

Answer:

Step 1: Convert -11π/3 into radians.

-11π/3 = -11π/3 * (180/π) = -11*180/3 = -1980/3

Step 2: Use the sin() function to calculate the value of sin(-1980/3).

sin(-1980/3) = -0.8660254037844386

Question:

If in two circles, arcs of the same length subtend angles 60∘ and 75∘ at the centre, find the ratio of their radii.

Answer:

Step 1: Draw a diagram of the two circles with arcs of the same length subtending angles of 60° and 75° at the centre.

Step 2: Label the radius of the two circles as r1 and r2.

Step 3: Using the formula for angles subtended by an arc at the centre of a circle, we can write:

60°/2π = r1/2r1

75°/2π = r2/2r2

Step 4: Divide both equations by each other to get:

r1/r2 = (60°/75°) * (2r2/2r1)

Step 5: Simplifying the equation, we get:

r1/r2 = (4/5)

Step 6: Thus, the ratio of the radii of the two circles is 4:5.

Question:

Find the value of tan 19π/3

Answer:

Step 1: Find the value of 19π/3 in degrees. (19π/3 = 570°)

Step 2: Use a calculator to find the value of tan 570°. (tan 570° = -1)

Question:

A wheel makes 360 revolutions in one minute. Through how many radians does it turn in one second?

Answer:

Step 1: Convert revolutions to radians.

1 revolution = 2π radians

Therefore, 360 revolutions = 360 x 2π = 720π radians

Step 2: Calculate radians per second.

Radians per second = 720π/60 seconds

Step 3: Simplify the equation.

Radians per second = 12π radians

Question:

Find the angle in radian though which a pendulum swings if its length is 75 cm and the tip describes an arc of length (i) 10 cm (ii) 15 cm (iii) 21 cm

Answer:

(i) 10 cm

Angle = (10/75) * 2π radians

= (2/15) * π radians

= (2π/15) radians

(ii) 15 cm

Angle = (15/75) * 2π radians

= (3/15) * π radians

= (3π/15) radians

(iii) 21 cm

Angle = (21/75) * 2π radians

= (7/15) * π radians

= (7π/15) radians

Question:

Find the value of sin 765∘

Answer:

Step 1: Convert 765° into radians.

1° = π/180

Therefore, 765° = (765 x π)/180 = (4π + 5π)/180 = 9π/180

Step 2: Use the sine formula to calculate the value of sin 765°.

sin 765° = sin (9π/180)

Step 3: Simplify the expression.

sin (9π/180) = sin (π/20)

Step 4: Use a calculator or a table of trigonometric values to find the value of sin (π/20).

sin (π/20) ≈ 0.309017

Question:

If in two circles, arcs of the same length subtend angles 60o and 75o at the centre, find the ratio of their radii.

Answer:

Step 1: Draw a diagram of two circles with the angles given.

Step 2: Label the angles as θ1 and θ2.

Step 3: Calculate the ratio of the radii using the formula: Ratio of Radii = tan(θ1)/tan(θ2)

Step 4: Substitute the values of θ1 and θ2 in the formula.

Step 5: The ratio of the radii = tan(60o)/tan(75o)

Step 6: The ratio of the radii = 0.866

Question:

Find the radian measures corresponding to the following degree measures:(i) 25∘(ii) −47∘30′(iii) 240∘(iv) 520∘

Answer:

(i) 25∘ = 25 x (π/180) = (25π)/180 radians

(ii) −47∘30′ = -47.5 x (π/180) = (-47.5π)/180 radians

(iii) 240∘ = 240 x (π/180) = (240π)/180 radians

(iv) 520∘ = 520 x (π/180) = (520π)/180 radians

Question:

Find the degree measures corresponding to the following radian measures (Use π=22​/7). (i) 11​/16 (ii) −4 (iii) 5π​/3 (iv) 7π/6

Answer:

(i) 11/16 radians = 11/16 x 180/π = 99°

(ii) −4 radians = −4 x 180/π = −226.19°

(iii) 5π/3 radians = 5π/3 x 180/π = 300°

(iv) 7π/6 radians = 7π/6 x 180/π = 315°

JEE స్టడీ మెటీరియల్ (గణితం)

01 సెట్లు

02 సంబంధాలు మరియు విధులు

03 త్రికోణమితి విధులు

04 గణిత ప్రేరణ సూత్రం

05 సంక్లిష్ట సంఖ్యలు మరియు చతుర్భుజ సమీకరణాలు

06 లీనియర్ అసమానతలు

07 ప్రస్తారణలు మరియు కలయికలు

08 ద్విపద సిద్ధాంతం

09 సీక్వెన్సులు మరియు సిరీస్

10 స్ట్రెయిట్ లైన్స్ వ్యాయామం

10 స్ట్రెయిట్ లైన్స్ ఇతరాలు

11 కోనిక్ విభాగాలు

12 త్రీ డైమెన్షనల్ జామెట్రీకి పరిచయం

13 పరిమితులు మరియు ఉత్పన్నాలు

14 గణిత రీజనింగ్

15 గణాంకాలు

16 సంభావ్యత