Q: Use trigonometric identities to write each expression in terms of a single trigonometric function or a constant. simplify cos t sin t?

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TRIGONOMETRIC FUNCTIONS OF ANY ANGLE

It is just a name invented by mathematicians.

No. Only a linear function has a constant rate of change.No. Only a linear function has a constant rate of change.No. Only a linear function has a constant rate of change.No. Only a linear function has a constant rate of change.

It is true that a rational function is a function whose equation contains a rational expression. This is used in various math classes.

Neither, by definition.

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Use trigonometric identities to simplify the equation so that you have a simple trigonometric term on one side of the equation and a simple value of the other. Then use the appropriate inverse trigonometric or arc function.

The basic primitive functions are constant function, power function, exponential function, logarithmic function, trigonometric functions (sine, cosine, tangent, etc.), and inverse trigonometric functions (arcsine, arccosine, arctangent, etc.).

Yes, but it is called a hyberbolic trigonometric function

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TRIGONOMETRIC FUNCTIONS OF ANY ANGLE

It is a trigonometric function. It is also continuous.

The presence of any term that is not a constant or a multiple of the independent variable. It can be any other power of that variable, or a trigonometric or exponential or any other function.

The trigonometric function of an angle gives a certain value The arc trigonometric function of value is simply the angle For example, if sin (30 degrees) = 0.500 then arc sine ( 0.500) = 30 degrees

An antitrigonometric function is another term for an inverse trigonometric function.

opposite/hypotenuse

A reciprocal trigonometric function is the ratio of the reciprocal of a trigonometric function to either the sine, cosine, or tangent function. The reciprocal of the sine function is the cosecant function, the reciprocal of the cosine function is the secant function, and the reciprocal of the tangent function is the cotangent function. These functions are useful in solving trigonometric equations and graphing trigonometric functions.

Trigonometric functions are defined from a numeric domain to a numeric range. So the input number determines whether or not the function is defined for that value and, if so, what the value of the function is.