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Mathematics

For each set of rational numbers, given below, verify the associative property of addition of rational numbers:

1,56-1 , \dfrac{5}{6} and 23\dfrac{-2}{3}

Rational Numbers

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Answer

To prove: (1+56)+23=1+(56+23)\Big(-1 + \dfrac{5}{6}\Big) + \dfrac{-2}{3} = -1 + \Big(\dfrac{5}{6} + \dfrac{-2}{3}\Big)

Taking LHS:

(1+56)+23=(11+56)+23\Big(-1 + \dfrac{5}{6}\Big) + \dfrac{-2}{3} \\[1em] = \Big(\dfrac{-1}{1} + \dfrac{5}{6}\Big) + \dfrac{-2}{3} \\[1em] LCM of 1 and 6 is 2 x 3 = 6

=(1×61×6+5×16×1)+23=(66+56)+23=(6+56)+23=16+23= \Big(\dfrac{-1 \times 6}{1 \times 6} + \dfrac{5 \times 1}{6 \times 1}\Big) + \dfrac{-2}{3} \\[1em] = \Big(\dfrac{-6}{6} + \dfrac{5}{6}\Big) + \dfrac{-2}{3} \\[1em] = \Big(\dfrac{-6 + 5}{6}\Big) + \dfrac{-2}{3} \\[1em] = \dfrac{-1}{6}+ \dfrac{-2}{3} \\[1em]

LCM of 6 and 3 is 2 x 3 = 6

=1×16×1+2×23×2=16+46=1+(4)6=56= \dfrac{-1 \times 1}{6 \times 1} + \dfrac{-2 \times 2}{3 \times 2} \\[1em] = \dfrac{-1}{6} + \dfrac{-4}{6} \\[1em] = \dfrac{-1 + (-4)}{6} \\[1em] = \dfrac{-5}{6} \\[1em]

Taking RHS: 1+(56+23)=11+(56+23)-1 + \Big(\dfrac{5}{6} + \dfrac{-2}{3}\Big) \\[1em] = \dfrac{-1}{1} + \Big(\dfrac{5}{6} + \dfrac{-2}{3}\Big) \\[1em]

LCM of 6 and 3 is 2 x 3 = 6 11+(5×16×1+2×23×2)=11+(56+46)=11+(5+(4)6)=11+16\dfrac{-1}{1} + \Big(\dfrac{5 \times 1}{6 \times 1} + \dfrac{-2 \times 2}{3 \times 2}\Big) \\[1em] = \dfrac{-1}{1} + \Big(\dfrac{5}{6} + \dfrac{-4}{6}\Big) \\[1em] = \dfrac{-1}{1} + \Big( \dfrac{5 +(-4)}{6}\Big) \\[1em] = \dfrac{-1}{1} + \dfrac{1}{6} \\[1em]

LCM of 1 and 6 is 2 x 3 = 6

=1×61×6+1×16×1=66+16=6+16=56= \dfrac{-1 \times 6}{1 \times 6} + \dfrac{1 \times 1}{6 \times 1} \\[1em] = \dfrac{-6}{6} + \dfrac{1}{6} \\[1em] = \dfrac{-6 + 1}{6} \\[1em] = \dfrac{-5}{6} \\[1em]

∴ LHS = RHS

(1+56)+23=1+(56+23)\Big(-1 + \dfrac{5}{6}\Big) + \dfrac{-2}{3} = -1 + \Big(\dfrac{5}{6} + \dfrac{-2}{3}\Big)

So, the associative property for the addition of the rational number is verified.

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