dextercioby said:Why do you think the range is not R, but it is restricted ? Usually plotting computer software knows its maths...
dextercioby said:So you want the subset of [itex] \mathbb{R}\oplus\mathbb{R} [/itex] made up of
[tex] S= \{(x,\arcsin x)| x\in [-1,1]\} [/tex]
and the values of arcsine are 'copied' from [itex] [-\pi/2,\pi/2] [/itex] into [itex] [-\pi/2 +n\pi ,\pi/2 + n \pi] [/itex] and n can take any integer value ?
So it's just an infinite multiplication of the plot of the standard arcsine with a shift along Oy axis of \pi.
The arcsin function, also known as inverse sine function, is a mathematical function that returns the angle whose sine is a given number. It is the inverse of the sine function and is denoted as arcsin(x) or sin^-1(x).
The restricted range of the arcsin function is between -π/2 and π/2, which means that the output of the function will always be within this range. This is because the sine function has a range of -1 to 1, and the inverse function must have a restricted range to have a unique output for every input.
Without a restricted range, the arcsin function would have an infinite range. This means that the output of the function could be any real number, positive or negative. It would no longer be a one-to-one function, as multiple inputs could result in the same output.
Yes, the graph of the arcsin function would change without a restricted range. Without a restricted range, the graph would no longer be a curve that is confined between -π/2 and π/2, but instead, it would extend infinitely in both the positive and negative directions.
Removing the restricted range in the arcsin function would make it more difficult to use in practical applications. It would also make it more challenging to find the inverse of the function, as it would no longer be a one-to-one function. Additionally, it would change the properties and behavior of the function, making it less useful in solving trigonometric equations.