How do you solve #4( x + 3) - 3a x = 25+ 3a# in terms of #a#?

1 Answer
Jun 10, 2017

#x = (13+3a)/(4-3a)#

Explanation:

'In terms of #a#' means there will be #a# in the answer, we cannot find just a number answer.

#4(x+3) -3ax = 25+3a" "larr# remove brackets

#4x+12 -3ax = 25+3a#

#4x-3ax = 25+3a-12larr# arrange with #x# terms on one side

#x(4-3a) = 13+3a" "larr# factorise to get #x# as a single factor

#x = (13+3a)/(4-3a)" "larr# solve for #x#