Sides of an equation: Difference between revisions
→Homogeneous and inhomogeneous equations: fixing wrong explanation-- e.g., bx+c=0 is not homogeneous even though the RHS is 0 |
|||
| Line 12: | Line 12: | ||
==Homogeneous and inhomogeneous equations== |
==Homogeneous and inhomogeneous equations== |
||
In solving mathematical equations, particularly [[linear simultaneous equations]], [[differential equation]]s and [[integral equation]]s, the terminology ''homogeneous'' is often used for equations with |
In solving mathematical equations, particularly [[linear simultaneous equations]], [[differential equation]]s and [[integral equation]]s, the terminology ''homogeneous'' is often used for equations with some [[linear operator]] ''L'' on the LHS and 0 on the RHS. In contrast, an equation with a non-zero RHS is called ''inhomogeneous'' or ''non-homogeneous'', with the difference being that between the equation |
||
A typical case is of some [[Operator (mathematics)|operator]] ''L'', with the difference being that between the equation |
|||
:''Lf'' = 0, |
:''Lf'' = 0, |
||
| Line 22: | Line 20: | ||
:''Lf'' = ''g'', |
:''Lf'' = ''g'', |
||
with ''g'' a fixed function, to solve again for ''f'' |
with ''g'' a fixed function, to solve again for ''f''. Then any solution of the inhomogeneous equation may have a solution of the homogeneous equation added to it, and still remain a solution. |
||
For example in [[mathematical physics]], the homogeneous equation may correspond to a physical theory formulated in [[Free space|empty space]], while the inhomogeneous equation asks for more 'realistic' solutions with some matter, or charged particles. |
For example in [[mathematical physics]], the homogeneous equation may correspond to a physical theory formulated in [[Free space|empty space]], while the inhomogeneous equation asks for more 'realistic' solutions with some matter, or charged particles. |
||
Revision as of 18:45, 28 July 2016
 | This article needs additional citations for verification. (December 2009) |
In mathematics, LHS is informal shorthand for the left-hand side of an equation. Similarly, RHS is the right-hand side. The two sides have the same value, expressed differently, since equality is symmetric. [1]
More generally, these terms may apply to an inequation or inequality; The right-hand side is everything on the right side of a test operator in an expression, with LHS defined similarly.
Some examples
The expression on the right side of the "=" sign is the right side of the equation and the expression on the left of the "=" is the left side of the equation.
For example, in
- x + 5 = y + 8,
"x + 5" is the left-hand side (LHS) and "y + 8" is the right-hand side (RHS).
Homogeneous and inhomogeneous equations
In solving mathematical equations, particularly linear simultaneous equations, differential equations and integral equations, the terminology homogeneous is often used for equations with some linear operator L on the LHS and 0 on the RHS. In contrast, an equation with a non-zero RHS is called inhomogeneous or non-homogeneous, with the difference being that between the equation
- Lf = 0,
to be solved for a function f, and the equation
- Lf = g,
with g a fixed function, to solve again for f. Then any solution of the inhomogeneous equation may have a solution of the homogeneous equation added to it, and still remain a solution.
For example in mathematical physics, the homogeneous equation may correspond to a physical theory formulated in empty space, while the inhomogeneous equation asks for more 'realistic' solutions with some matter, or charged particles.
Syntax
More abstractly, when using infix notation
- T*U
the term T stands as the left-hand side and U as the right-hand side of the operator *. This usage is less common, though.
See also
References
- ^ Engineering Mathematics, John Bird, p65: definition and example of abbreviation