If a rhombus is re-shaped such that one of its diagonal increase | Math Question and Answer

Answer:

0.16% decrease

Step by Step Explanation:

Let's assume the length of the diagonals BD and AC of the rhombus ABCD are p and q respectively.
The area of the rhombus =
pq
2
According to the question, one of its diagonal increases by 4%, while other diagonal decreases by 4%.
The new length of the diagonal BD = p + p ×
4
100
= p + 0.04p = (1 + 0.04)p
The new length of the diagonal AC = q - q ×
4
100
= q - 0.04q = (1 - 0.04)q
Now, the area of the rhombus =
(1 + 0.04)p × (1 - 0.04)q
2

=
(1² - 0.04²)pq
2
...[Since, (a + b)(a - b) = a² - b²]
=
pq - 0.0016pq
2
Change in area = New area of the rhombus - The area of the rhombus
=
pq - 0.0016pq
2
-
pq
2

=
pq - 0.0016pq - pq
2

=
-0.0016pq
2
% Change in area =
Change in area
The area of the rhombus
× 100
=

-0.0016pq
2

pq
2

× 100
= -0.16%
Thus, the area of the rhombus is decreased by 0.16%.

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