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Question 346964: 6(2/3[2 3 1/2[-4 2
6 -5 3 0
-1 0]+ 1 -8])
this is the best i can do i hope you can read it.
Answer by haileytucki(390)   (Show Source):
You can put this solution on YOUR website! I am not too sure I understood your equation, yet I was able to determine a solution to what I interpreted:
6((2)/(3[(231)/(2[-426-530-10])+1-8]))
Subtract 530 from -426 to get -956.
6((2)/(3[(231)/(2[-956-10])+1-8]))
Subtract 10 from -956 to get -966.
6((2)/(3[(231)/(2[-966])+1-8]))
Multiply 2 by -966 to get -1932.
6((2)/(3[(231)/(2*-966)+1-8]))
Multiply 2 by -966 to get -1932.
6((2)/(3[(231)/(-1932)+1-8]))
Move the minus sign from the denominator to the front of the expression.
6((2)/(3[-((231)/(1932))+1-8]))
Reduce the expression (231)/(1932) by removing a factor of 21 from the numerator and denominator.
6((2)/(3[-((11)/(92))+1-8]))
Multiply -1 by the (11)/(92) inside the parentheses.
6((2)/(3[-(11)/(92)+1-8]))
Subtract 8 from 1 to get -7.
6((2)/(3[-(11)/(92)-7]))
To add fractions, the denominators must be equal. The denominators can be made equal by finding the least common denominator (LCD). In this case, the LCD is 92. Next, multiply each fraction by a factor of 1 that will create the LCD in each of the fractions.
6((2)/(3[-7*(92)/(92)-(11)/(92)]))
Complete the multiplication to produce a denominator of 92 in each expression.
6((2)/(3[-(644)/(92)-(11)/(92)]))
Combine the numerators of all fractions that have common denominators.
6((2)/(3[(-644-11)/(92)]))
Subtract 11 from -644 to get -655.
6((2)/(3[(-655)/(92)]))
Move the minus sign from the numerator to the front of the expression.
6((2)/(3[-(655)/(92)]))
Multiply (2)/(3) by -(92)/(655) to get -(184)/(1965).
6(-(184)/(1965))
Multiply 6 by each term inside the parentheses.
-(368)/(655)
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