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A²,b²,c² are consecutive perfect squares.How many natura numbers are lying between a² and c², if a>0

User Paxal
by
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1 Answer

11 votes
11 votes

Answer:

The quantity of natural numbers between
a^(2) and
c^(2) is
2\cdot (a + b) + 1.

Explanation:

If
a^(2),
b^(2) and
c^(2) are consecutive perfect squares, then both
a,
b and
c are natural numbers and we have the following quantities of natural numbers:

Between
b^(2) and
c^(2):


c^(2) = (b+1)^(2)


c^(2) = b^(2)+2\cdot b + 1


c^(2)-b^(2) = 2\cdot b + 1

And the quantity of natural numbers between
b^(2) and
c^(2) is:


c^(2)-b^(2)-1 = 2\cdot b

Between
a^(2) and
b^(2):


b^(2) = (a + 1)^(2)


b^(2) = a^(2) +2\cdot a + 1


b^(2)-a^(2) = 2\cdot a + 1

And the quantity of natural numbers between
a^(2) and
b^(2) is:


b^(2)-a^(2)-1 = 2\cdot a

And the quantity of natural numbers between
a^(2) and
c^(2) is:


Diff = 2\cdot a + 2\cdot b + 1

Please observe that the component +1 represents the natural number
b^(2)

User Kurt Harriger
by
3.5k points