Write the general solution to y = arcsin 0.

To find the general solution to the equation y = arcsin(0), we need to solve for all possible values of y that satisfy the equation.

The arcsin function (also written as sin^(-1)) gives us the angle whose sine is a given value. In this case, we are looking for the angle whose sine is 0.

We know that the sine of 0 degrees is 0, and the arcsin function gives us the angle (in radians) when the sine is equal to 0.

So, to find the solution, we need to determine all angles that have a sine of 0.

Since sine is a periodic function, we can find the general solution by considering all angles that are offset by integer multiples of 2π, where π is the Greek letter pi, approximately equal to 3.14159.

The angles with a sine of 0 are 0 degrees and 180 degrees (or 0 radians and π radians). Adding or subtracting 2π to these angles will give us more solutions.

Therefore, the general solution to y = arcsin(0) is:

y = 0 + 2πk, where k is an integer representing any number of complete rotations around the unit circle.

The angles whose sin is zero are 0, pi, 2pi, 3 pi, .... n * pi radians

or 0 degrees, 180 degrees , 360 degrees .... n * 180 degrees
which I suppose you could say is n pi where n can be zero or any positive integer

LOL, or n can be negative whole number