There are two slightly different types of "normal curve tables", more precisely: of tables of the cumulative distribution function (CDF) of the standard normal distribution N(0, 1): Some tabulate the actual cumulative distribution function F, which satisfies F(u)=P(X<=u) for a random variable X having a standard normal distribution (so that P(X<=u) is the probability that such a random variable takes a value less than or equal to u). Others tabulate, for non-negative u, the values of F(u) - 0.5, i.e. the probabilities P(0<X<=u). Your table is of the latter type.

Remember that the area under the bell-shaped curve representing the probability density function (PDF) of the standard normal distribution equals 1 and that it is symmetric about the y-axis, so that F(0)=P(X<=0)=0.5.

The SAS function CDF calculates values of cumulative distribution functions. In particular, CDF('NORMAL', u) returns F(u). As mentioned above, you have to subtract 0.5 in order to arrive at the values found in your table.

data _null_;
p=cdf('NORMAL', 2.84)-0.5;
put p 6.4;
run; /* 0.4977 */

data _null_;
p=cdf('NORMAL', 1)-0.5;
put p 6.4;
run; /* 0.3413 */

PDF('NORMAL', u) returns the value of the standard normal probability density function. Its symmetry mentioned above means that PDF('NORMAL', u)=PDF('NORMAL', -u) for all numbers u. For calculating probabilities, CDF is the function to use.