Section: Mathematical Operators
y = a ./ b
where a
and b
are n
-dimensional arrays of numerical type. In the
first case, the two arguments are the same size, in which case, the
output y
is the same size as the inputs, and is the element-wise
division of b
by a
. In the second case, either a
or b
is a scalar,
in which case y
is the same size as the larger argument,
and is the division of the scalar with each element of the other argument.
The type of y
depends on the types of a
and b
using type
promotion rules, with one important exception: unlike C
, integer
types are promoted to double
prior to division.
If a
is a scalar, then the output is computed via
On the other hand, if b
is a scalar, then the output is computed via
./
operator. The first example
is straightforward:
--> 3 ./ 8 ans = 0.3750
Note that this is not the same as evaluating 3/8
in C
- there,
the output would be 0
, the result of the integer division.
We can also divide complex arguments:
--> a = 3 + 4*i a = 3.0000 + 4.0000i --> b = 5 + 8*i b = 5.0000 + 8.0000i --> c = a ./ b c = 0.5281 - 0.0449i
If a complex
value is divided by a double
, the result is
promoted to dcomplex
.
--> b = a ./ 2.0 b = 1.5000 + 2.0000i
We can also demonstrate the three forms of the dot-right-divide operator. First the element-wise version:
--> a = [1,2;3,4] a = 1 2 3 4 --> b = [2,3;6,7] b = 2 3 6 7 --> c = a ./ b c = 0.5000 0.6667 0.5000 0.5714
Then the scalar versions
--> c = a ./ 3 c = 0.3333 0.6667 1.0000 1.3333 --> c = 3 ./ a c = 3.0000 1.5000 1.0000 0.7500