DistFlow

Z-Score Table (Standard Normal Table)

The Z-score table (also called the standard normal table) gives the cumulative probability P(Z ≤ z) for the standard normal distribution (μ = 0, σ = 1). Each cell shows the area under the bell curve to the left of the z-value.

Hover over or tap any cell to see the corresponding shaded area on the companion chart. Use the search box to jump directly to a specific z-value.

z \ +0.000.010.020.030.040.050.060.070.080.09
0.00.50000.50400.50800.51200.51600.51990.52390.52790.53190.5359
0.10.53980.54380.54780.55170.55570.55960.56360.56750.57140.5753
0.20.57930.58320.58710.59100.59480.59870.60260.60640.61030.6141
0.30.61790.62170.62550.62930.63310.63680.64060.64430.64800.6517
0.40.65540.65910.66280.66640.67000.67360.67720.68080.68440.6879
0.50.69150.69500.69850.70190.70540.70880.71230.71570.71900.7224
0.60.72570.72910.73240.73570.73890.74220.74540.74860.75170.7549
0.70.75800.76110.76420.76730.77040.77340.77640.77940.78230.7852
0.80.78810.79100.79390.79670.79950.80230.80510.80780.81060.8133
0.90.81590.81860.82120.82380.82640.82890.83150.83400.83650.8389
1.00.84130.84380.84610.84850.85080.85310.85540.85770.85990.8621
1.10.86430.86650.86860.87080.87290.87490.87700.87900.88100.8830
1.20.88490.88690.88880.89070.89250.89440.89620.89800.89970.9015
1.30.90320.90490.90660.90820.90990.91150.91310.91470.91620.9177
1.40.91920.92070.92220.92360.92510.92650.92790.92920.93060.9319
1.50.93320.93450.93570.93700.93820.93940.94060.94180.94290.9441
1.60.94520.94630.94740.94840.94950.95050.95150.95250.95350.9545
1.70.95540.95640.95730.95820.95910.95990.96080.96160.96250.9633
1.80.96410.96490.96560.96640.96710.96780.96860.96930.96990.9706
1.90.97130.97190.97260.97320.97380.97440.97500.97560.97610.9767
2.00.97720.97780.97830.97880.97930.97980.98030.98080.98120.9817
2.10.98210.98260.98300.98340.98380.98420.98460.98500.98540.9857
2.20.98610.98640.98680.98710.98750.98780.98810.98840.98870.9890
2.30.98930.98960.98980.99010.99040.99060.99090.99110.99130.9916
2.40.99180.99200.99220.99250.99270.99290.99310.99320.99340.9936
2.50.99380.99400.99410.99430.99450.99460.99480.99490.99510.9952
2.60.99530.99550.99560.99570.99590.99600.99610.99620.99630.9964
2.70.99650.99660.99670.99680.99690.99700.99710.99720.99730.9974
2.80.99740.99750.99760.99770.99770.99780.99790.99790.99800.9981
2.90.99810.99820.99820.99830.99840.99840.99850.99850.99860.9986
3.00.99870.99870.99870.99880.99880.99890.99890.99890.99900.9990
3.10.99900.99910.99910.99910.99920.99920.99920.99920.99930.9993
3.20.99930.99930.99940.99940.99940.99940.99940.99950.99950.9995
3.30.99950.99950.99950.99960.99960.99960.99960.99960.99960.9997
3.40.99970.99970.99970.99970.99970.99970.99970.99970.99970.9998
3.50.99980.99980.99980.99980.99980.99980.99980.99980.99980.9998
3.60.99980.99980.99990.99990.99990.99990.99990.99990.99990.9999
3.70.99990.99990.99990.99990.99990.99990.99990.99990.99990.9999
3.80.99990.99990.99990.99990.99990.99990.99990.99990.99990.9999
3.91.00001.00001.00001.00001.00001.00001.00001.00001.00001.0000
Distribution Curve
How to Use
  1. Find the row for your z-value's integer and first decimal (e.g., 1.6)
  2. Find the column for the second decimal (e.g., 0.04 for z = 1.64)
  3. The cell gives P(Z ≤ 1.64) ≈ 0.9495
  4. For negative z: use P(Z ≤ −z) = 1 − P(Z ≤ z)

Explore this distribution interactively:

Open Standard Distribution →

Frequently Asked Questions

How do I read a Z-score table?

Find the row for the ones and tenths digit (e.g., 1.9) and the column for the hundredths digit (e.g., 0.06). The cell at that intersection gives P(Z ≤ 1.96) ≈ 0.9750.

What is the Z-score for a 95% confidence interval?

For a two-tailed 95% confidence interval, you need Z = 1.96. This leaves 2.5% in each tail: P(Z ≤ 1.96) ≈ 0.975.

How do I find P(Z > z) using this table?

The table gives P(Z ≤ z). To find the right-tail probability, compute P(Z > z) = 1 − P(Z ≤ z).

Does this table cover negative Z-scores?

This table shows z ≥ 0. For negative z, use symmetry: P(Z ≤ −z) = 1 − P(Z ≤ z).