Use Table to obtain the areas under the standard normal curve. Sketch a standard normal curve and shade the area of interest in each problem.

Find the area under the standard normal curve that lies to the right of

a. $2.02$.

b. $-0.56$.

c. $-4$.

The given number $2.02$is positive. Therefore, the conventional normal table of positive $z$scores is applied. To begin, reduce the number in the left hand column labeled '$z$' to $2.0$and then move across the row to the column labeled '$0.02$'. The result is $0.9783.$

As a result, the area to the right of $2.02$under the usual normal is $1-0.9783=0.0217.$

Area to the right $=1$- Area to the left

The given quantity is negative, the conventional normal table of negative $z$ scores is applied. First, move down to$-0.5$ in the right-hand column labelled' $z$ ', then across the row to the column labelled' $0.06$ ', and you'll get$0.2877.$

Area to the right $=1$- Area to the left

Because the given number $-4$ is negative, the conventional normal table of negative $z$ scores is applied. To begin, travel down the right hand column labeled '$z$' to $-4.0$ and then across the row to the column labeled '$0.00$' to obtain the number$0.0000.$