Joint and Combined Variation PDF

Summary

This document explains joint and combined variation in mathematics. It covers examples and solutions, helping readers understand how variables relate to each other through direct and inverse variations. It is suitable for secondary school math students.

Full Transcript

Joint and
Combined
Variation
Joint Variation
▪ It occurs when one quantity
varies directly as the product
of two or more other quantities
Joint Variation
y varies jointly as x and z if
there exists a nonzero
number k such that y = kxz,
where x≠0 and z≠0
Joint Variation
Example:
The area of a rectangle varies
jointly as its length and width.
Find the equation of joint
variation if A = 60 sq.ft, l = 15
ft, and w = 4 ft
Joint Variation
Solution:
The area (A)
Varies jointly = (K)
as
its length (h) and (.)
Width (W)
Joint Variation
Solution:
A = klw
60 = k (15)(4)
60 = 60
k=1
Combined Variation
▪ It describes a situation where
a variable depends on two (or
more) other variables, and
varies directly with some of
them and varies inversely with
others (when the rest of the
variables are held constant).
Combined Variation
If a situation is modelled by an
equation of the form:
y=
Where k is a nonzero constant,
we say that y varies directly as x
and inversely as z. The number
(k) is called the constant
variation
Combined Variation
Example:
If y varies directly as x and
inversely as z, and y = 22 when
x = 4 and z = 6, find y when x =
10 and z = 25
Combined Variation
Solution:
Step 1: y =
Step 2: 22 =
132 = 4k
33 = k
Combined Variation
Solution:
Step 3: y =
Step 4: y =
Final Answer: y =