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प्रश्न
The ratio of the areas of a circle and an equilateral triangle whose diameter and a side are respectively equal, is
विकल्प
\[\pi: \sqrt{2}\]
\[\pi: \sqrt{3}\]
\[\sqrt{3}: \pi\]
\[\sqrt{2}: \pi\]
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उत्तर
We are given that diameter and side of an equilateral triangle are equal.
Let d and a are the diameter and side of circle and equilateral triangle respectively.
`∴ d=a`
We know that area of the circle =`pir^2`
Area of the equilateral triangle =`sqrt3/4 a^2`
Now we will find the ratio of the areas of circle and equilateral triangle.
`∴ "Area of circle"/"Area of equilateral triangle"=(pir^2)/(sqrt3/4 a)`
We know that radius is half of the diameter of the circle.
`∴ "Area of circle"/"Area of equilateral triangle"=(pi (d/2)^2)/(sqrt3/4 a^2)`
`∴ "Area of circle"/"Area of equilateral triangle"=(pixxd^2/4)/(sqrt3/4 a^2)`
Now we will substitute `d=a` in the above equation,
`∴ "Area of circle"/"Area of equilateral triangle"= ( pixxa^2/4)/(sqrt3/4 a^2)`
`∴ "Area of circle"/"Area of equilateral triangle"=pi/sqrt3`
Therefore, ratio of the areas of circle and equilateral triangle is `pi:sqrt3`
