Question 1020482
<pre>
P(z < 1.55)

This asks for what percentage of the graph below is shaded
expressed as a decimal.  Notice that the shaded area is left
of z = 1.55: 

{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(-5,0,-5,0.37266532*10^(-5)),line(-4.9,0,-4.9,0.6113568*10^(-5)),line(-4.8,0,-4.8,0.99295043*10^(-5)),line(-4.7,0,-4.7,0.15966784*10^(-4)),line(-4.6,0,-4.6,0.25419347*10^(-4)),line(-4.5,0,-4.5,0.40065297*10^(-4)),line(-4.4,0,-4.4,0.62521504*10^(-4)),line(-4.3,0,-4.3,0.96593414*10^(-4)),line(-4.2,0,-4.2,0.14774836*10^(-3)),line(-4.1,0,-4.1,0.22374579*10^(-3)),line(-4.0,0,-4.0,0.33546263*10^(-3)),line(-3.9,0,-3.9,0.49795542*10^(-3)),line(-3.8,0,-3.8,0.73180242*10^(-3)),line(-3.7,0,-3.7,0.10647662*10^(-2)),line(-3.6,0,-3.6,0.15338107*10^(-2)),line(-3.5,0,-3.5,0.21874911*10^(-2)),line(-3.4,0,-3.4,0.30887154*10^(-2)),line(-3.3,0,-3.3,0.431784*10^(-2)),line(-3.2,0,-3.2,0.59760229*10^(-2)),line(-3.1,0,-3.1,0.8188701*10^(-2)),line(-3.0,0,-3.0,0.11108997*10^(-1)),line(-2.9,0,-2.9,0.14920786*10^(-1)),line(-2.8,0,-2.8,0.19841095*10^(-1)),line(-2.7,0,-2.7,0.2612141*10^(-1)),line(-2.6,0,-2.6,0.34047455*10^(-1)),line(-2.5,0,-2.5,0.43936934*10^(-1)),line(-2.4,0,-2.4,0.56134763*10^(-1)),line(-2.3,0,-2.3,0.71005354*10^(-1)),line(-2.2,0,-2.2,0.88921617*10^(-1)),line(-2.1,0,-2.1,0.11025053),line(-2.0,0,-2.0,0.13533528),line(-1.9,0,-1.9,0.16447446),line(-1.8,0,-1.8,0.1978987),line(-1.7,0,-1.7,0.23574608),line(-1.6,0,-1.6,0.2780373),line(-1.5,0,-1.5,0.32465247),line(-1.4,0,-1.4,0.3753111),line(-1.3,0,-1.3,0.42955736),line(-1.2,0,-1.2,0.48675226),line(-1.1,0,-1.1,0.54607443),line(-1.0,0,-1.0,0.60653066),line(-0.9,0,-0.9,0.66697681),line(-0.8,0,-0.8,0.72614904),line(-0.7,0,-0.7,0.78270454),line(-0.6,0,-0.6,0.83527021),line(-0.5,0,-0.5,0.8824969),line(-0.4,0,-0.4,0.92311635),line(-0.3,0,-0.3,0.95599748),line(-0.2,0,-0.2,0.98019867),line(-0.1,0,-0.1,0.99501248),line(-0.10269563e-14,0,-0.10269563e-14,1.0),line(0.1,0,0.1,0.99501248),line(0.2,0,0.2,0.98019867),line(0.3,0,0.3,0.95599748),line(0.4,0,0.4,0.92311635),line(0.5,0,0.5,0.8824969),line(0.6,0,0.6,0.83527021),line(0.7,0,0.7,0.78270454),line(0.8,0,0.8,0.72614904),line(0.9,0,0.9,0.66697681),line(1.0,0,1.0,0.60653066),line(1.1,0,1.1,0.54607443),line(1.2,0,1.2,0.48675226),line(1.3,0,1.3,0.42955736),line(1.4,0,1.4,0.3753111),line(1.5,0,1.5,0.32465247),locate(20,20,1))}}}  

To find it in the normal table which I have pasted 
below (scroll down) you will have to break up this 
area into two parts.

This part:                             plus                this part:

{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(-5,0,-5,0.37266532*10^(-5)),line(-4.9,0,-4.9,0.6113568*10^(-5)),line(-4.8,0,-4.8,0.99295043*10^(-5)),line(-4.7,0,-4.7,0.15966784*10^(-4)),line(-4.6,0,-4.6,0.25419347*10^(-4)),line(-4.5,0,-4.5,0.40065297*10^(-4)),line(-4.4,0,-4.4,0.62521504*10^(-4)),line(-4.3,0,-4.3,0.96593414*10^(-4)),line(-4.2,0,-4.2,0.14774836*10^(-3)),line(-4.1,0,-4.1,0.22374579*10^(-3)),line(-4.0,0,-4.0,0.33546263*10^(-3)),line(-3.9,0,-3.9,0.49795542*10^(-3)),line(-3.8,0,-3.8,0.73180242*10^(-3)),line(-3.7,0,-3.7,0.10647662*10^(-2)),line(-3.6,0,-3.6,0.15338107*10^(-2)),line(-3.5,0,-3.5,0.21874911*10^(-2)),line(-3.4,0,-3.4,0.30887154*10^(-2)),line(-3.3,0,-3.3,0.431784*10^(-2)),line(-3.2,0,-3.2,0.59760229*10^(-2)),line(-3.1,0,-3.1,0.8188701*10^(-2)),line(-3.0,0,-3.0,0.11108997*10^(-1)),line(-2.9,0,-2.9,0.14920786*10^(-1)),line(-2.8,0,-2.8,0.19841095*10^(-1)),line(-2.7,0,-2.7,0.2612141*10^(-1)),line(-2.6,0,-2.6,0.34047455*10^(-1)),line(-2.5,0,-2.5,0.43936934*10^(-1)),line(-2.4,0,-2.4,0.56134763*10^(-1)),line(-2.3,0,-2.3,0.71005354*10^(-1)),line(-2.2,0,-2.2,0.88921617*10^(-1)),line(-2.1,0,-2.1,0.11025053),line(-2.0,0,-2.0,0.13533528),line(-1.9,0,-1.9,0.16447446),line(-1.8,0,-1.8,0.1978987),line(-1.7,0,-1.7,0.23574608),line(-1.6,0,-1.6,0.2780373),line(-1.5,0,-1.5,0.32465247),line(-1.4,0,-1.4,0.3753111),line(-1.3,0,-1.3,0.42955736),line(-1.2,0,-1.2,0.48675226),line(-1.1,0,-1.1,0.54607443),line(-1.0,0,-1.0,0.60653066),line(-0.9,0,-0.9,0.66697681),line(-0.8,0,-0.8,0.72614904),line(-0.7,0,-0.7,0.78270454),line(-0.6,0,-0.6,0.83527021),line(-0.5,0,-0.5,0.8824969),line(-0.4,0,-0.4,0.92311635),line(-0.3,0,-0.3,0.95599748),line(-0.2,0,-0.2,0.98019867),line(-0.1,0,-0.1,0.99501248),line(-0.10269563e-14,0,-0.10269563e-14,1.0),locate(20,20,1))}}}{{{""+""}}}{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(0,0,0,1.0),line(0.1,0,0.1,0.99501248),line(0.2,0,0.2,0.98019867),line(0.3,0,0.3,0.95599748),line(0.4,0,0.4,0.92311635),line(0.5,0,0.5,0.8824969),line(0.6,0,0.6,0.83527021),line(0.7,0,0.7,0.78270454),line(0.8,0,0.8,0.72614904),line(0.9,0,0.9,0.66697681),line(1.0,0,1.0,0.60653066),line(1.1,0,1.1,0.54607443),line(1.2,0,1.2,0.48675226),line(1.3,0,1.3,0.42955736),line(1.4,0,1.4,0.3753111),line(1.5,0,1.5,0.32465247),locate(20,20,1))}}}

The shaded area on the left graph is obviously 1/2 or 0.5000
because half the graph is shaded.  The right part is what we 
look up in the table.  To use the table we break z=1.55 into
two parts the part up to the tenths place, 1.5, and the hunreths
place 0.05. We find 1.5 in the far left column and then go right
to the column headed 0.05 and read 0.4394. Then we add 
0.5000 + 0.4394 and get 0.9394.  That's the answer.

----------------------------------------

P(Z > -1.44)

This asks for what percentage of the graph below is shaded
expressed as a decimal.  Notice that the shaded area is right
of z = -1.44:

{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(-1.44,0,-1.44,0.35458755),line(-1.34,0,-1.34,0.4074651),line(-1.24,0,-1.24,0.46356902),line(-1.14,0,-1.14,0.5221502),line(-1.04,0,-1.04,0.58228224),line(-0.94,0,-0.94,0.6428782),line(-0.84,0,-0.84,0.70271772),line(-0.74,0,-0.74,0.76048416),line(-0.64,0,-0.64,0.81481026),line(-0.54,0,-0.54,0.86433055),line(-0.44,0,-0.44,0.90773754),line(-0.34,0,-0.34,0.9438387),line(-0.24,0,-0.24,0.97161077),line(-0.14,0,-0.14,0.99024786),line(-0.04,0,-0.04,0.99920032),line(0.06,0,0.06,0.99820162),line(0.16,0,0.16,0.98728157),line(0.26,0,0.26,0.96676484),line(0.36,0,0.36,0.9372549),line(0.46,0,0.46,0.89960455),line(0.56,0,0.56,0.85487502),line(0.66,0,0.66,0.80428628),line(0.76,0,0.76,0.74916202),line(0.86,0,0.86,0.69087249),line(0.96,0,0.96,0.63077882),line(1.06,0,1.06,0.57018181),line(1.16,0,1.16,0.5102778),line(1.26,0,1.26,0.45212346),line(1.36,0,1.36,0.39661073),line(1.46,0,1.46,0.34445218),line(1.56,0,1.56,0.29617642),line(1.66,0,1.66,0.25213264),line(1.76,0,1.76,0.21250282),line(1.86,0,1.86,0.17731987),line(1.96,0,1.96,0.14648972),line(2.06,0,2.06,0.11981577),line(2.16,0,2.16,0.0970237),line(2.26,0,2.26,0.77785519*10^(-1)),line(2.36,0,2.36,0.61741436*10^(-1)),line(2.46,0,2.46,0.48518991*10^(-1)),line(2.56,0,2.56,0.3774886*10^(-1)),line(2.66,0,2.66,0.29077227*10^(-1)),line(2.76,0,2.76,0.22174773*10^(-1)),line(2.86,0,2.86,0.16742582*10^(-1)),line(2.96,0,2.96,0.12515342*10^(-1)),line(3.06,0,3.06,0.92623267*10^(-2)),line(3.16,0,3.16,0.67866353*10^(-2)),line(3.26,0,3.26,0.4923183*10^(-2)),line(3.36,0,3.36,0.35358555*10^(-2)),line(3.46,0,3.46,0.25142016*10^(-2)),line(3.56,0,3.56,0.1769957*10^(-2)),line(3.66,0,3.66,0.12336229*10^(-2)),line(3.76,0,3.76,0.851254*10^(-3)),line(3.86,0,3.86,0.58155791*10^(-3)),line(3.96,0,3.96,0.39335423*10^(-3)),line(4.06,0,4.06,0.26340969*10^(-3)),line(4.16,0,4.16,0.17463718*10^(-3)),line(4.26,0,4.26,0.11463012*10^(-3)),line(4.36,0,4.36,0.74493402*10^(-4)),line(4.46,0,4.46,0.47928512*10^(-4)),line(4.56,0,4.56,0.30530023*10^(-4)),line(4.66,0,4.66,0.19253841*10^(-4)),line(4.76,0,4.76,0.12021666*10^(-4)),line(4.86,0,4.86,0.74313724*10^(-5)),line(4.96,0,4.96,0.45481045*10^(-5)),locate(20,20,1))}}}


To find it in the normal table below you will 
also have to break up this area into two parts.

This part:                             plus                this part:
{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(-1.44,0,-1.44,0.35458755),line(-1.34,0,-1.34,0.4074651),line(-1.24,0,-1.24,0.46356902),line(-1.14,0,-1.14,0.5221502),line(-1.04,0,-1.04,0.58228224),line(-0.94,0,-0.94,0.6428782),line(-0.84,0,-0.84,0.70271772),line(-0.74,0,-0.74,0.76048416),line(-0.64,0,-0.64,0.81481026),line(-0.54,0,-0.54,0.86433055),line(-0.44,0,-0.44,0.90773754),line(-0.34,0,-0.34,0.9438387),line(-0.24,0,-0.24,0.97161077),line(-0.14,0,-0.14,0.99024786),line(-0.04,0,-0.04,0.99920032),locate(20,20,1))}}}{{{""+""}}}{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(0,0,0,1.0),line(0.1,0,0.1,0.99501248),line(0.2,0,0.2,0.98019867),line(0.3,0,0.3,0.95599748),line(0.4,0,0.4,0.92311635),line(0.5,0,0.5,0.8824969),line(0.6,0,0.6,0.83527021),line(0.7,0,0.7,0.78270454),line(0.8,0,0.8,0.72614904),line(0.9,0,0.9,0.66697681),line(1.0,0,1.0,0.60653066),line(1.1,0,1.1,0.54607443),line(1.2,0,1.2,0.48675226),line(1.3,0,1.3,0.42955736),line(1.4,0,1.4,0.3753111),line(1.5,0,1.5,0.32465247),line(1.6,0,1.6,0.2780373),line(1.7,0,1.7,0.23574608),line(1.8,0,1.8,0.1978987),line(1.9,0,1.9,0.16447446),line(2.0,0,2.0,0.13533528),line(2.1,0,2.1,0.11025053),line(2.2,0,2.2,0.88921617*10^(-1)),line(2.3,0,2.3,0.71005354*10^(-1)),line(2.4,0,2.4,0.56134763*10^(-1)),line(2.5,0,2.5,0.43936934*10^(-1)),line(2.6,0,2.6,0.34047455*10^(-1)),line(2.7,0,2.7,0.2612141*10^(-1)),line(2.8,0,2.8,0.19841095*10^(-1)),line(2.9,0,2.9,0.14920786*10^(-1)),line(3.0,0,3.0,0.11108997*10^(-1)),line(3.1,0,3.1,0.8188701*10^(-2)),line(3.2,0,3.2,0.59760229*10^(-2)),line(3.3,0,3.3,0.431784*10^(-2)),line(3.4,0,3.4,0.30887154*10^(-2)),line(3.5,0,3.5,0.21874911*10^(-2)),line(3.6,0,3.6,0.15338107*10^(-2)),line(3.7,0,3.7,0.10647662*10^(-2)),line(3.8,0,3.8,0.73180242*10^(-3)),line(3.9,0,3.9,0.49795542*10^(-3)),line(4.0,0,4.0,0.33546263*10^(-3)),line(4.1,0,4.1,0.22374579*10^(-3)),line(4.2,0,4.2,0.14774836*10^(-3)),line(4.3,0,4.3,0.96593414*10^(-4)),line(4.4,0,4.4,0.62521504*10^(-4)),line(4.5,0,4.5,0.40065297*10^(-4)),line(4.6,0,4.6,0.25419347*10^(-4)),line(4.7,0,4.7,0.15966784*10^(-4)),line(4.8,0,4.8,0.99295043*10^(-5)),line(4.9,0,4.9,0.6113568*10^(-5)),line(5.0,0,5.0,0.37266532*10^(-5)),locate(20,20,1))}}}

The shaded area on the rightt graph is obviously 1/2 or 0.5000
because half the graph is shaded.  The left part is what we 
look up in the table.  To use the table we break z=1.44 into
two parts the part up to the tenths place, 1.4, and the hunreths
place 0.04. We find 1.4 in the far left column and then go right 
to the column headed 0.04 and read 0.4251. Then we add 
0.4251 + 0.5000 and get 0.9251.  That's the answer.

{{{drawing(400,200,-5,5,-.5,1.5, graph(400,200,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(-1.34,0,-1.34,0.4074651),line(-1.24,0,-1.24,0.46356902),line(-1.14,0,-1.14,0.5221502),line(-1.04,0,-1.04,0.58228224),line(-0.94,0,-0.94,0.6428782),line(-0.84,0,-0.84,0.70271772),line(-0.74,0,-0.74,0.76048416),line(-0.64,0,-0.64,0.81481026),line(-0.54,0,-0.54,0.86433055),line(-0.44,0,-0.44,0.90773754),line(-0.34,0,-0.34,0.9438387),line(-0.24,0,-0.24,0.97161077),line(-0.14,0,-0.14,0.99024786),line(-0.04,0,-0.04,0.99920032),line(0.06,0,0.06,0.99820162),line(0.16,0,0.16,0.98728157),line(0.26,0,0.26,0.96676484),line(0.36,0,0.36,0.9372549),line(0.46,0,0.46,0.89960455),line(0.56,0,0.56,0.85487502),line(0.66,0,0.66,0.80428628),line(0.76,0,0.76,0.74916202),line(0.86,0,0.86,0.69087249),line(0.96,0,0.96,0.63077882),line(1.06,0,1.06,0.57018181),line(1.16,0,1.16,0.5102778),line(1.26,0,1.26,0.45212346),line(1.36,0,1.36,0.39661073),line(1.46,0,1.46,0.34445218),line(1.56,0,1.56,0.29617642),line(1.66,0,1.66,0.25213264),line(1.76,0,1.76,0.21250282),line(1.86,0,1.86,0.17731987),line(1.96,0,1.96,0.14648972),line(2.06,0,2.06,0.11981577),line(2.16,0,2.16,0.0970237),line(2.26,0,2.26,0.77785519*10^(-1)),line(2.36,0,2.36,0.61741436*10^(-1)),line(2.46,0,2.46,0.48518991*10^(-1)),line(2.56,0,2.56,0.3774886*10^(-1)),line(2.66,0,2.66,0.29077227*10^(-1)),line(2.76,0,2.76,0.22174773*10^(-1)),line(2.86,0,2.86,0.16742582*10^(-1)),line(2.96,0,2.96,0.12515342*10^(-1)),line(3.06,0,3.06,0.92623267*10^(-2)),line(3.16,0,3.16,0.67866353*10^(-2)),line(3.26,0,3.26,0.4923183*10^(-2)),line(3.36,0,3.36,0.35358555*10^(-2)),line(3.46,0,3.46,0.25142016*10^(-2)),line(3.56,0,3.56,0.1769957*10^(-2)),line(3.66,0,3.66,0.12336229*10^(-2)),line(3.76,0,3.76,0.851254*10^(-3)),line(3.86,0,3.86,0.58155791*10^(-3)),line(3.96,0,3.96,0.39335423*10^(-3)),line(4.06,0,4.06,0.26340969*10^(-3)),line(4.16,0,4.16,0.17463718*10^(-3)),line(4.26,0,4.26,0.11463012*10^(-3)),line(4.36,0,4.36,0.74493402*10^(-4)),line(4.46,0,4.46,0.47928512*10^(-4)),line(4.56,0,4.56,0.30530023*10^(-4)),line(4.66,0,4.66,0.19253841*10^(-4)),line(4.76,0,4.76,0.12021666*10^(-4)),line(4.86,0,4.86,0.74313724*10^(-5)),line(4.96,0,4.96,0.45481045*10^(-5)),locate(20,20,1))}}}

P(-0.91  < z < -.33)

{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(-0.91,0,-0.91,0.6609679),
line(-0.81,0,-0.81,0.720327),line(-0.71,0,-0.71,0.77720588),
line(-0.61,0,-0.61,0.83023208),
line(-0.51,0,-0.51,0.87805153),line(-0.41,0,-0.41,0.91938529),locate(20,20,1))}}}

In this case both ends of the shading are on the same side of
the middle, we will have to subtract two areas.  Notice in the
above two cases the ends were on opposite sides of the middle, 
so we ADDED.  But here they are on the same side of the middle,
so we SUBTRACT these shadings:

This part:                            minus                this part:
{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(-0.91,0,-0.91,0.6609679),line(-0.81,0,-0.81,0.720327),line(-0.71,0,-0.71,0.77720588),line(-0.61,0,-0.61,0.83023208),line(-0.51,0,-0.51,0.87805153),line(-0.41,0,-0.41,0.91938529),line(-0.31,0,-0.31,0.95308613),line(-0.21,0,-0.21,0.97819132),line(-0.11,0,-0.11,0.99396826),line(-0.01,0,-0.01,0.99995),locate(20,20,1))}}}{{{""-""}}}{{{drawing(300,150,-5,5,-.5,1.5, graph(300,150,-5,5,-.5,1.5, exp(-x^2/2)),
locate(4.8,-.01,z),locate(4.8,.2,z),line(-0.33,0,-0.33,0.94700586),line(-0.23,0,-0.23,0.97389674),line(-0.13,0,-0.13,0.9915856),line(-0.03,0,-0.03,0.9995501),locate(20,20,1))}}}

We look up 0.91 in the table which is the first area, 0.3186.  
Then we look up the second number 0.33, and find the area to 
the middle as 0.1293.  Then we subtract 0.3186-0.1293 and get
0.1893.  That's the answer:

<font size = 1><b>
Z	0.00	0.01	0.02	0.03	0.04	0.05	0.06	0.07	0.08	0.09
0.0	0.0000	0.0040	0.0080	0.0120	0.0160	0.0199	0.0239	0.0279	0.0319	0.0359
0.1	0.0398	0.0438	0.0478	0.0517	0.0557	0.0596	0.0636	0.0675	0.0714	0.0753
0.2	0.0793	0.0832	0.0871	0.0910	0.0948	0.0987	0.1026	0.1064	0.1103	0.1141
0.3	0.1179	0.1217	0.1255	0.1293	0.1331	0.1368	0.1406	0.1443	0.1480	0.1517
0.4	0.1554	0.1591	0.1628	0.1664	0.1700	0.1736	0.1772	0.1808	0.1844	0.1879
0.5	0.1915	0.1950	0.1985	0.2019	0.2054	0.2088	0.2123	0.2157	0.2190	0.2224
0.6	0.2257	0.2291	0.2324	0.2357	0.2389	0.2422	0.2454	0.2486	0.2517	0.2549
0.7	0.2580	0.2611	0.2642	0.2673	0.2704	0.2734	0.2764	0.2794	0.2823	0.2852
0.8	0.2881	0.2910	0.2939	0.2967	0.2995	0.3023	0.3051	0.3078	0.3106	0.3133
0.9	0.3159	0.3186	0.3212	0.3238	0.3264	0.3289	0.3315	0.3340	0.3365	0.3389
1.0	0.3413	0.3438	0.3461	0.3485	0.3508	0.3531	0.3554	0.3577	0.3599	0.3621
1.1	0.3643	0.3665	0.3686	0.3708	0.3729	0.3749	0.3770	0.3790	0.3810	0.3830
1.2	0.3849	0.3869	0.3888	0.3907	0.3925	0.3944	0.3962	0.3980	0.3997	0.4015
1.3	0.4032	0.4049	0.4066	0.4082	0.4099	0.4115	0.4131	0.4147	0.4162	0.4177
1.4	0.4192	0.4207	0.4222	0.4236	0.4251	0.4265	0.4279	0.4292	0.4306	0.4319
1.5	0.4332	0.4345	0.4357	0.4370	0.4382	0.4394	0.4406	0.4418	0.4429	0.4441
1.6	0.4452	0.4463	0.4474	0.4484	0.4495	0.4505	0.4515	0.4525	0.4535	0.4545
1.7	0.4554	0.4564	0.4573	0.4582	0.4591	0.4599	0.4608	0.4616	0.4625	0.4633
1.8	0.4641	0.4649	0.4656	0.4664	0.4671	0.4678	0.4686	0.4693	0.4699	0.4706
1.9	0.4713	0.4719	0.4726	0.4732	0.4738	0.4744	0.4750	0.4756	0.4761	0.4767
2.0	0.4772	0.4778	0.4783	0.4788	0.4793	0.4798	0.4803	0.4808	0.4812	0.4817
2.1	0.4821	0.4826	0.4830	0.4834	0.4838	0.4842	0.4846	0.4850	0.4854	0.4857
2.2	0.4861	0.4864	0.4868	0.4871	0.4875	0.4878	0.4881	0.4884	0.4887	0.4890
2.3	0.4893	0.4896	0.4898	0.4901	0.4904	0.4906	0.4909	0.4911	0.4913	0.4916
2.4	0.4918	0.4920	0.4922	0.4925	0.4927	0.4929	0.4931	0.4932	0.4934	0.4936
2.5	0.4938	0.4940	0.4941	0.4943	0.4945	0.4946	0.4948	0.4949	0.4951	0.4952
2.6	0.4953	0.4955	0.4956	0.4957	0.4959	0.4960	0.4961	0.4962	0.4963	0.4964
2.7	0.4965	0.4966	0.4967	0.4968	0.4969	0.4970	0.4971	0.4972	0.4973	0.4974
2.8	0.4974	0.4975	0.4976	0.4977	0.4977	0.4978	0.4979	0.4979	0.4980	0.4981
2.9	0.4981	0.4982	0.4982	0.4983	0.4984	0.4984	0.4985	0.4985	0.4986	0.4986
3.0	0.4987	0.4987	0.4987	0.4988	0.4988	0.4989	0.4989	0.4989	0.4990	0.4990
</font></b>
Edwin</pre>