Question

If the sum of two adjacent integral sides of a
rectangle is equal to its area, how many
different values can the length of the
rectangle take?
​

Answer 1

Answer:

only one

Step-by-step explanation:

Answer 2

Given :- If the sum of two adjacent integral sides of a

rectangle is equal to its area, how many different values can the length of the rectangle take ?

Solution :-

Let us assume that, Length of the rectangle is L unit and Breadth is B unit .

since adjacent integral sides of a rectangle are length and breadth .

given that,

→ Length + Breadth = Area

→ (L + B) = L * B

only natural number satisfy this condition are ,

→ (2 + 2) = 2 * 2

→ 4 = 4 .

therefore, Length and breadth both will be equal to 2 units in this case .

Hence, Only 1 possible value can the length of the

rectangle take .

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