First, consider that we need to transform y=sqrt(x) into y=sqrt(-x). For this, we need to reflect the function f(x) across the y-axis. After that reflection, we end up with:
![y=\sqrt[]{-x},\text{ y-axis reflection}](https://img.qammunity.org/2023/formulas/mathematics/college/abx7e4r50xz4fgjz70se1mz1bbmvmjoetj.png)
Now, we need to implement a translation to the left by 5 units. After implementing this, we obtain:
![y=\sqrt[]{(-x-5)},\text{ horizontal translation to the left by 5 units}](https://img.qammunity.org/2023/formulas/mathematics/college/56dyo2k8d1houe722750q5w9g09s5hrq56.png)
Then, the constant 2. A constant in that position means that the function is vertically stretched by that constant. In this case, the function is vertically stretched by 2 units.
![y=2\sqrt[\square]{-x-5},\text{ vertical stretch by 2 units}](https://img.qammunity.org/2023/formulas/mathematics/college/763jmxsfxkf7dg3oqc5z0jncc6sy4h1o1b.png)
Finally, a constant in the position where +3 represents a vertical shift (Upwards if the constant is positive and downwards if the constant is negative). Then, in this case, it is a vertical translation upwards by 3 units.
![y=2\sqrt[]{-x-5}+3,\text{ vertical translation upwards by 3 units}](https://img.qammunity.org/2023/formulas/mathematics/college/7uplu0rszkbawhg24a2mev7ks9i632hl0k.png)