How do you solve #k/7+3-2k=-3#?

2 Answers
Jun 1, 2018

Combine like terms - this is a linear equation

Explanation:

Combine like terms - the two containing #k# and the two that are just numbers. This gives #(13k)/7=6#, so #k=42/13#.

Jun 1, 2018

#k=42/13#

Explanation:

Re=arrange the terms with the variables on the left and the numbers on the right: (subtract #3# from both sides)

#k/7 -2k = -3-3#

#k/7 -2k =-6#

Multiply each term by #7# to get rid of the fraction.
#(cancel7xxk)/cancel7 -7xx2k = 7xx-6#

#k-14k = -42#

#-13k = -42" "larr div -13#

#k = 42/13#