What is value of CSC?
The secant of x is 1 divided by the cosine of x: sec x = 1 cos x , and the cosecant of x is defined to be 1 divided by the sine of x: csc x = 1 sin x .
In this regard, What are the 6 trig functions of 180?
1 Answer
- sin180∘=0.
- cos180∘=−1.
- tan180∘=0.
- sec180∘=−1.
- cot180∘=∞
Regarding this, How do you find the value of csc?
Therefore, we obtain our first alternative cosecant formula: csc(x) = (sin(x))⁻¹ . Or, if you prefer fractions, csc(x) = 1 / sin(x) .
Beside above, Is the value of sin 60?
From the above equations, we get sin 60 degrees exact value as √3/2.
What is the csc of 60? Trigonometry Examples
The exact value of csc(60) is 2√3 .
22 Related Questions Answers Found
What is the value of Cosec 180 degree?
Therefore, the value of cos 180° is -1.
What are the 6 trig functions of?
The trigonometric functions include the following 6 functions: sine, cosine, tangent, cotangent, secant, and cosecant. For each of these functions, there is an inverse trigonometric function. The trigonometric functions can be defined using the unit circle.
What is the exact value of csc 225?
Important Angle Summary
θ° | θ radians | csc(θ) |
---|---|---|
180° | π | 0 |
210° | 7π/6 | -2 |
225 ° | 5π/4 | -√2 |
240° | 4π/3 | -2√3/3 |
What is the exact value of csc 4pi 3?
Trigonometry Examples
The exact value of csc(π3) csc ( π 3 ) is 2√3 .
What is the value of sin 2 60?
The exact value of sin(60) is √32 .
How do you find the value of sin 60?
Quiz Time
What is the sin of 60 in radians?
Sines and cosines for special common angles
Degrees | Radians | sine |
---|---|---|
90° | π/2 | 1 |
60° | π/3 | √3 / 2 |
45° | π/4 | √2 / 2 |
30° | π/6 | 1/2 |
What is the exact value of tan 60?
Therefore, the exact value of Tan 60 degrees is √3. We can also derive the values of tan 0°, 30°, 45°, 90°, 180°, 270° and 360° in the same way.
What is the exact value of cot 60?
Trigonometry Examples
The exact value of cot(60) is 1√3 .
What is the value of Cosec 360 degree?
Value of csc(360 degree) or Cosec(360 degree) = -4,082,944,682,095,960.0000
Degree / Radian | Function | |
---|---|---|
(angle in degree) (angle in radian) | Sin Cos Tan Cot Sec Cosec SinH CosH TanH CosecH SecH CotH Arc Sin Arc Cos Arc Tan Arc Cosec Arc Sec Arc Cot | ( |
What is the value of Cosec 210?
The value of cosec 210° is -2.
What is the exact value of tan 90?
The exact value of tan 90 is infinity or undefined.
What are the basics of trigonometry?
There are three basic functions in trigonometry, each of which is one side of a right-angled triangle divided by another. You may find it helpful to remember Sine, Cosine and Tangent as SOH CAH TOA.
How do we use trigonometry in real life?
Trigonometry is used to set directions such as the north south east west, it tells you what direction to take with the compass to get on a straight direction. It is used in navigation in order to pinpoint a location. It is also used to find the distance of the shore from a point in the sea.
What are the 3 trigonometric functions?
There are three basic trigonometric ratios: sine , cosine , and tangent . Given a right triangle, you can find the sine (or cosine, or tangent) of either of the non- 90° angles.
What is the exact value of csc 300 degrees?
Trigonometric Function Values of Special Angles
θ° | θ radians | csc(θ) |
---|---|---|
240° | 4π/3 | -2√3/3 |
270° | 3π/2 | -1 |
300° | 5π/3 | -2√3/3 |
315° | 7π/4 | -√2 |
What is the exact value of sin 300 degrees?
Trigonometric Function Values of Special Angles
θ° | θ radians | sin(θ) |
---|---|---|
270° | 3π/2 | -1 |
300° | 5π/3 | -√3/2 |
315° | 7π/4 | -√2/2 |
330° | 11π/6 | -1/2 |
What is the exact value of csc 90?
The exact value of csc(90°) csc ( 90 ° ) is 1 .
What is the exact value of tan 5pi 4?
Answer: The exact value of is 1.
What is the COT of 7pi 4?
The cot of 7pi/4 radians is -1, the same as cot of 7pi/4 radians in degrees. To change 7pi/4 radians to degrees multiply 7pi/4 by 180° / = 315°. Cot 7pi/4 = cot 315 degrees.
What is the sine value of 5pi 3?
The angle 5pi/3 is in the fourth quadrant (meaning cosine is positive while sine & tangent are negative), and its reference angle is 60 degrees with respect to the horizontal. Therefore its sine is -sqrt(3)/2, its cosine is 1/2, and its tangent is -sqrt(3).
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