< Real Analysis
We begin with listing various sets of numbers that are important in mathematical analysis.
| or N | The natural numbers |
| or Z | The integers |
| or Q | The rational numbers |
| or R | The real numbers |
| or C | The complex numbers |
| For all | |
| Exists/There Exists | |
| Subset, Proper Subset | |
| Superset, Proper Superset | |
| Belongs to | |
| Set Subtraction | |
| Union | |
| Intersection | |
| Absolute value | |
| Supremum/Least Upper Bound | |
| Infimum/Greatest Lower Bound | |
| Empty Set | |
| Logical And |
| Alpha | |
| Beta | |
| Gamma | |
| Delta | |
| Epsilon | |
| Zeta | |
| Eta | |
| Theta | |
| Iota | |
| Kappa | |
| Lambda | |
| Mu | |
| Nu | |
| Xi | |
| Omicron | |
| Pi | |
| Rho | |
| Sigma | |
| Tau | |
| Upsilon | |
| Phi | |
| Chi | |
| Psi | |
| Omega |
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