How do you solve #\frac { 9} { 4} ( \frac { 41} { 6} b + \frac { 4} { 3} ) - \frac { 15} { 4} = - \frac { 2859} { 40}#?

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Answer 1 · 2017-09-02T19:42:45

#b= -23/5#

First put the #-15/4# to the other side to make it positive and add it

to the #-2859/40#. #-15/4# must have a denominator of 40 so

multiply by 10 to get #-150/40#.

#9/4(41/6 b +4/3) = -2859/40 + 150/40#

#9/4(41/6 b +4/3) = -2709/40#

Now divide by #9/4# to get rid of the multiplication but you also have to divide #-2709/40# by #9/4# as well.

#(9/4(41/6 b +4/3))/(9/4) = (-2709/40)/(9/4)#

The two #9/4# cancel out. Now the problem looks like this:

#41/6 b +4/3= -10836/360#

Now subtract #4/3#:

#41/6 b = -10836/360 - 4/3 -> 41/6 b = -943/30#

Multiply by 6 to get rid of the denominator:

#41b = -943/30 *6 -> 41b = -943/5#

Finally, divide by 41 to isolate b.

#b = (-943/5)/41#

#b = -23/5#