Question

find two consecutive natural numbers
whose sum is 63​

Answer 1

Answer:

31&32 is the answer

Step-by-step explanation:

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Answer 2

Let the two consecutive natural numbers be 'x' and 'x+1'

Given :

• Sum of two consecutive natural numbers = 63

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To find :

• The two natural consecutive numbers

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Solution :

According to the question...

x + (x+1) = 63

$\implies { 2x + 1 = 63 }$

$\implies { 2x = 63 - 1}$

$\implies {2x = 62 }$

$\implies {x = {\dfrac{62}{2}}}$

$\implies{x = {\dfrac{{\cancel {{62\ }_{31}}}}{{\not {2}}}}}$

$\implies{\boxed {x = 31 }}$

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$\therefore {The\ numbers\ are\ 31 (x=31)\ and\ 32 (x+1 = 31 + 1 =32)}$

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Verification :

We can verify by substituting the value of 'x' in the equation ...

x + (x+1) = 63

$\implies {31 + (31+1) = 63 }$

$\implies {31 + 32 = 63 }$

$\therefore {LHS\ =\ RHS }$

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Hence Verified !