We will start by completing a table of values for the function, rounding to two decimal places where necessary:

The function is of the form f\left(x\right)=\sqrt{x-h} with h=-2.

The function has been translated to the left by 2 units.

As the graph has been translated 2 units to the left, the domain will change. The range will stay the same.

Domain: \left[-2, \infty\right)

Range: \left[0, \infty\right)

The function is increasing if the y-values increase as x increases.

The function is decreasing if the y-values decrease as x increases.

We can see that the y-values are increasing as x increases, so the function is increasing over its domain.

If we consider the graph of f\left(x\right)=\sqrt{x} compared to that of g\left(x\right)

We can see that the graph of g\left(x\right) increases 3 times faster than that of f\left(x\right), which means that g\left(x\right) has a vertical stretch by a factor of 3.

The parent function f\left(x\right)=\sqrt{x} has been translated 1 units to the right, stretched vertically by a factor of 3 and then translated 2 units upwards.

Notice that we cannot find the vertical stretch factor by comparing f\left(x\right) with g\left(x\right) at the same x-values, because their starting points are different.

This is because the stretch happens before the vertical translation, but after the horizontal translation.

If we look at the general function: y=a\sqrt{x-h}+k we can see that \sqrt{x-h} is multiplied by the stretch factor a and then k is added.

The general function is y=a\sqrt{x-h}+k, and we have

• The graph is dilated vertically by a factor of a=3
• The graph is translated to the right by h=1 units
• The graph is translated upwards by k=2 units

The equation of the function is g\left(x\right)=3\sqrt{x-1}+2