Y varies inversely with x. When y = 0.7, x = 1.8. What is the value of k, the constant of inverse variation? Round to the nearest hundredth, if necessary.

2 Answers
Jun 25, 2018

#k=1.26# (nearest to 100th).

Explanation:

Direct proportion is given by: #y prop x#
Inverse proportion is given by #y prop 1/x#

So here we have inverse proportion:

#y= prop 1/x#

#0.7 prop 1/1.8#

Removing the #prop# sign and we get the constant #k#.

#0.7 prop 1/1.8#

#0.7 = k.(1/1.8)#

#0.7 = k/1.8#

#0.7 xx 1.8 = k#

#1.26 = k#

Therefore #k=1.26# (nearest to 100th).

Jun 25, 2018

#1.26#

Explanation:

If #y# is inversely proportional to #x#, then we have:

#yprop1/x#

or

#y*x=k#

#=>xy=k#

We got: #x=1.8,y=0.7#

#:.k=1.8*0.7#

#=1.26#