How do you solve #-\frac { 2} { 5} x + 3= \frac { 2} { 3} x + \frac { 1} { 3}#?

1 Answer
Oct 16, 2016

Showing first principle method in detail. Once you are used to this approach start using shortcuts. They are very much faster.

#x=5/2#

Explanation:

#color(blue)("Method:")#

#color(brown)("Step 1:")#
Manipulate the equation so that you have collected all the terms with #x# in them on one side of the equals and everything else on the other side.

#color(brown)("Step 2:")#
Manipulate the equation so that you only have 1 #x# and for that to be on its own on one side of the equals and everything else on the other side.
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Given:#" "-2/5x+3=2/3x+1/3#

#color(green)("Step 1")#
The #2/3x# is positive so move the #-2/5x# to the other side so that all our #x# terms are positive.#

Add #color(blue)(2/5x)#to both sides

#color(brown)(-2/5xcolor(blue)(+2/5x)+3" "=" "2/3xcolor(blue)(+2/5x)+1/3)#

#" "0+3" "=" "2/3x+2/5x+1/3#

Subtract #1/3# from both sides

#" "3-1/3" "=" "2/3x+2/5x+0#

#" "8/3" "=" "16/15x#
...............................................................................................................

#color(green)("Step 2")#

Multiply both sides by#15/16#. This turns #16/15 x" into "1xx x->x#

#8/3xx15/16=x#

This is the same as:

#8/16xx15/3=x#

#1/2xx5=x#

#x=5/2#