I know that the domain of the square root function has to equal to the minimum possible number (0) to have all the other numbers equal to 0 or be more than 0, but since the x value has to make the value under the square root sign equal to 0, whenever we subtract the two values it always equals to 0, hence the range of the square root function is always = 0.
So, does the range of a square root function always equals to 0?
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$\begingroup$Any value under a square root must be ≥ 0, not always equal to 0. Similarly, the min value of range is 0. Not all values of under root are equal to 0 Please do clear your basics.
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