Mathematics
Grade-7
Easy
Question
The product of
is ___________.
Hint:
Solve using the BODMASS rule.
The correct answer is: ![25 over 6](data:image/png;base64,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)
STEP BY STEP SOLUTION
![negative 2 1 half space cross times space minus 1 2 over 3
C o n v e r t i n g space m i x e d space f r a c t i o n space i n t o space s i m p l e space f r a c t i o n
space equals space minus 5 over 2 space cross times space minus 5 over 3 space equals space fraction numerator 5 space cross times space 5 over denominator 2 space cross times space 3 end fraction space equals space 25 over 6](data:image/png;base64,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)
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Mathematics
Graph the opposite of the number shown on the number line.
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)
Graph the opposite of the number shown on the number line.
![](data:image/png;base64,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)
MathematicsGrade-7