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With ease, I suppose. The question depends on what you consider easy trigonometric functions.

Q: How do you solve easy trigonometric functions of angle?

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It can. And does, for example, in the hyperbolic trigonometric functions. It can make the solution harder but there is no law that says that solutions must be easy!

its solve easy

Not easy...

easy

To solve all sorts of problems. Any equation can be written in the form: (some expression) = 0 Simply by putting everything to the left. It turns out that polynomials are especially easy to solve if you put them in that form - because then you can solve them simply by factoring them. In other cases, for other functions, it might be more of a convention to put them in that form.

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It can. And does, for example, in the hyperbolic trigonometric functions. It can make the solution harder but there is no law that says that solutions must be easy!

The answer depends on what the starting expression is. It is not easy to generate an equivalent expression for trigonometric functions, for example, without using an infinite series of exponents.

its solve easy

Adding, Subtracting, Multiplying, Dividing and Trigonometric Calculus.

Not easy...

easy

The answer for this very easy answer to solve is 50. That is the average. The answer for this very easy answer to solve is 50. That is the average.

To solve all sorts of problems. Any equation can be written in the form: (some expression) = 0 Simply by putting everything to the left. It turns out that polynomials are especially easy to solve if you put them in that form - because then you can solve them simply by factoring them. In other cases, for other functions, it might be more of a convention to put them in that form.

I like the right angle because it is easy to identify.

angle parking is quite easy also

Angle

A function f(x) of the variable x, has a period k where k is some constant, if f(x+ k) = f(x) for every x. It is easy to show that f(x + nk) = f(x) for any integer n. What the above two formulae imply is that the values of the function repeat after an interval (or period) of k. The trigonometric functions are some of the better known periodic functions.