The cosecant is one of the trigonometric functions closely related to the sine function. The cosecant function is the reciprocal of the sine function and is defined as the ratio between the the length of hypotenuse and length of the opposite side of a right triangle. csc(θ) = hypotenuse /...
The other functions use a radius of secant (tan/sec) or cosecant (cot/csc).Q3: What's the swapped function?We make a mini-triangle by shrinking the original triangle down, and rotating so dx matches the side of length 1. It would be strange if, after rotation, the original colors (...
You could also use to “many to one” rule: Is a function: “many to one“. This is saying if you have multiple x-values that map to one y-value — say, (2,9), (3,9) and (6,9) — then that still qualifies as a function. Put more simply, it’s okay for a function to...
Step 3: If necessary, use algebra to simplify your final equation. Definitions on How to Convert an Equation Written in Polar Form to Rectangular Form Involving the Trigonometric Identities Secant, Cosecant & Cotangent Polar Form: An equ...
Press Enter key to get the cosecant of the angle. Also, you can directly use the number in the formula: =CSCH(1)Other Functions: Excel CSC FunctionThe Excel CSC function returns the cosecant of an angle provided in radians.Excel CHOOSEROWS FunctionThe COLUMN function returns the number of...
Whichever side you lean towards, the reasoning is the same: The body has to burn additional calories to maintain its core temperature of 98.6 degrees Fahrenheit. Cold workout advocates argue that the body has to use extra calories to raise the body temperature, while hot workout advocates belie...
Explain how to use the Pythagorean theorem and how it relates to the terms sine, cosine, and tangent. Six Trigonometric Ratios: Given a right-triangle {eq}\triangle ABC {/eq} having the following properties: {eq}\angle C {/eq} is a right angle; {eq...
Step 3: Label the sides of the special right triangle from Step 2 and use these values to determine sine and cosecant of the reference angle. Sine and cosecant of the original angle is plus or minus sine and cosecant, respectively, of the reference angle, depending ...
The secant, cosecant and cotangent are used very rarely used, because with the same inputs we could also just use the sine, cosine and tangent. Therefore, a lot of people would not even know they exist. The Pythagorean Theorem The Pythagorean Theoremis closely related to the sides of right...
We’dliketo ask “What angle has a secant of 8?”. But we can’t, since we only have a book of arccosines. We use our cheatsheet diagram to relate secant to cosine: Ah, I see that “sec/1 = 1/cos”, so A secant of 8 implies a cosine of 1/8. The angle with a cosine ...