Ans: C
Consider the general case $y=f(x+h)+k$.
Consider the general case $y=f(x+h)+k$.
If $h$ is positive, then the graph translates to the left $h$ units. If $h$ is negative, then the graph translates to the right $-h$ units.
If $k$ is positive, then the graph translates upwards $k$ units. If $k$ is negative, then the graph translates downwards $-k$ units.
Consider the graph of $y=f(x-2)+1$. The graph $y=f(x)$ translates to the right $2$ units and upwards $1$ units.
