How do you solve #-5/13 + (-3 5/7)#?

2 Answers
Dec 14, 2017

See a solution process below:

Explanation:

First, rewrite the expression as:

#-5/13 - 3 5/7#

Next, convert the number on the right from a mixed number to an improper fraction:

#3 5/7 = 3 + 5/7 = (7/7 xx 3) + 5/7 = 21/7 + 5/7 = (21 + 5)/7 = 26/7#

Then, put each fraction over a common denominator:

#5/13 = 7/7 xx 5/13 = (7 xx 5)/(7 xx 13) = 35/91#

#26/7 = 13/13 xx 26/7 =(13 * 26)/(13 xx 7) = 338/21#

We can now rewrite the expression again and perform the subtraction:

-35/91 - 338/91 = (-35 - 338)/91 = -373/91#

If necessary, we can convert this number to a mixed number:

#373/91 = -(364 + 9)/91 = -(364/91 + 9/91) = -(4 + 9/91) = -4 9/91#

Dec 14, 2017

#-5/13+(-3 5/7)# simplifies to #-373/91# or #-4 9/91#.

Explanation:

This is an expression, not an equation, so it cannot be solved, but it can be simplified.

Given:

#-5/13+(-3 5/7)#

Simplify the parentheses.

#-5/13-3 5/7#

Convert #3 5/7# to an improper fraction by multiplying the denominator by the whole number and adding the numerator, placing the result over the denominator.

#3 5/7=(7xx3+5)/7=26/7#

Rewrite the expression.

#-5/13-26/7#

In order to add or subtract fractions, they must have the same denominator, called the least common denominator (LCD) or least common multiple (LCM).

Since #13# and #7# are prime numbers, the LCD is the product of #13# and #7#.

#13xx7=91#

In order to make the denominators the same, multiply each fraction by a fraction equal to #1# that will not change the value, but will make both denominators #91#. For example, #5/5=1#

#-5/13xxcolor(teal)(7/7)-26/7xxcolor(magenta)(13/13)#

Simplify.

#-35/91-338/91#

#(-35-338)/91#

#-373/91#

Convert #-373/91# to a mixed fraction. To do this, divide #-373# by #91#. Take the first whole number and make the remainder the numerator over #91#.

#"-373-:91##=##-4# #"R"# #9#

#-373/91=-4 9/91#