Question #d7fa5

1 Answer
Feb 22, 2017

#X=(abc)/(bc+ac+ab)#

Explanation:

One way of solving the equation for X is to express the right side as a single fraction.

To do this we require the fractions to have a #color(blue)"common denominator"#

This requires the #color(blue)"lowest common multiple"# (LCM) of the denominators a , b and c

The LCM of a, b and c is abc

Each fraction has one factor of abc on the denominator so multiplying numerator/denominator by the product of the other 2 factors will give the common denominator required.

#rArr1/axxcolor(red)((bc)/(bc))+1/bxxcolor(blue)((ac)/(ac))+1/cxxcolor(magenta)((ab)/(ab))#

#=(bc)/(abc)+(ac)/(abc)+(ab)/(abc)larr" common denominator"#

We can now add the numerators, leaving the denominator.

#rArr1/X=(bc+ac+ab)/(abc)#

To solve for X, either #color(blue)"cross-multiply"# or #color(red)"invert"# both sides of the equation.

cross-multiplying gives.

#X(bc+ac+ab)=1xxabc=abc#

#rArrX=(abc)/(bc+ac+ab)#