How do you determine the constant of variation for the direct variation given by #2x=4y#?

1 Answer
Oct 10, 2015

Constant of variation #= 1/2# (assuming the normal situation where #y# is considered the dependent variable).

Explanation:

Normally when defining a direct variation between the variables #x# and #y#, the variable #y# is considered dependent upon #x# (i.e. #y# is thought of as being equivalent to #f(x)#)
and
the direct variation equation, in this case, is of the form:
#color(white)("XXX")y=cx# where #c# is the constant of variation.

#color(white)("XXXXXX")2x=4y#
#color(white)("XXXXXX")iff 4y=2x#
#color(white)("XXXXXX")iff y = (1/2)x#
#color(white)("XXX")rarr c= (1/2)#

It is possible (although unlikely) that the intent was to specify #x# as the dependent variable (i.e. #x _= g(y)#)
In this case the direct variation equation would be of the form:
#color(white)("XXX")x=cy#

#color(white)("XXXXXX")2x=4y#
#color(white)("XXXXXX")iff x=2y#
#color(white)("XXX")rarr c=2#