Programmer Guide/Command Reference/EVAL/wsum: Difference between revisions

From STX Wiki
Jump to navigationJump to search
No edit summary
No edit summary
Line 7: Line 7:
:'''<code>sum(<var>x</var>, <var>y</var>, <var>w</var>, <var>s</var>, <var>rv</var>)</code>'''
:'''<code>sum(<var>x</var>, <var>y</var>, <var>w</var>, <var>s</var>, <var>rv</var>)</code>'''
:'''<code>sum(<var>x</var>, <var>y</var>, <var>w</var>, <var>s</var>, <var>rm</var>)</code>'''
:'''<code>sum(<var>x</var>, <var>y</var>, <var>w</var>, <var>s</var>, <var>rm</var>)</code>'''
:;<var>x, y</var>: the x- and y-data vector; y[i] = f(x[i])
:;<var>x, y</var>: the x- and y-data vector: <code>''y''[i] = f(''x''[i])</code>
:;<var>w</var>: defines the type of the weighting function  
:;<var>w</var>: defines the type of the weighting function  
::{|class="keinrahmen"
::{|class="keinrahmen"

Revision as of 12:24, 8 April 2011

Calculate the weighted sum over one or more user-defined extents of a function y = f(x). Depending on the number of extents, the result of the function is a vector or a scalar.

Usage
wsum(x, y, w, s, us, os, n)
sum(x, y, w, s, uv, ov)
sum(x, y, w, s, rv)
sum(x, y, w, s, rm)
x, y
the x- and y-data vector: y[i] = f(x[i])
w
defines the type of the weighting function
w=0 no weight (rectangle)
w=1 triangle
w=2 hanning window
w=2 hamming window
s
if this argument is set to 1 the sum of each extent is normalized (scaled by 1/sum(weights)), otherwise not
us, os, n
Every pair {'us'+d*k, us+d*(k+1)} (with: d=(os-us)/n, k=0..n-1) defines an extent to sum. All three arguments are scalars.
uv, ov
Every pair {uv[k], ov[k]} (with k=0..nrow(uv)-1) defines an extent to sum. Both arguments must be vectors with same length.
rv
Every pair {rv[k], rv[k+1]} (with k=0..nrow(rv)-2) defines an extent to sum. The argument must be vector.
rm
Every pair {rm[k,0], rm[k,1]} (with k=0..nrow(rm)-1) defines an extent to sum. The argument must be matrix with 2 columns.
Result
The result r is a scalar or a vector. Each element ri is the sum of weighted the y values over the i-th extent {xmini, xmaxi}.
Note: an extent is defined by the x-range {xmin, xmax} and not by the indices!
See also
sum, hist

<function list>

Navigation menu

Personal tools