Question

Represent the pie chart given below. 。
The following table gives the number different fruits kept in a carton. mangoes = 52, Apple 62, oranges 42 coconut = 10 ,pomegranate = 16



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Answer 1

${\large{\pmb{\sf{\underline{Required \; Solution-}}}}}$

${\pmb{\sf{Understanding \: the \: Question-}}}$

✯ As it is given that we have to make a pie chart of that data that is already given. The given data is of a carton that contains differ-differ types of fruits. Let us see in which quantity the fruits are in the carton.

● Mangoes in the carton = 52

● Apples in the carton = 62

● Oranges in the carton = 42

● Coconut in the carton = 10

● Pomegranate in the carton = 16

${\pmb{\sf{Given \: that-}}}$

● There is a fruit carton given.

● Mangoes in the carton = 52

● Apples in the carton = 62

● Oranges in the carton = 42

● Coconut in the carton = 10

● Pomegranate in the carton = 16

${\pmb{\sf{Full \; Solution-}}}$

Firstly to draw a pie chart we have to find out the central angle of the given data. How to find? Firstly have to write the quantity line by line then have to make the fraction in the numerator part have to write the quantity and in denominator part we have to write the total of the given data . The have to multiply fraction by 360 as it is common angle here. So let's find out the central angle first!

● Mangoes in the carton = 52

● Apples in the carton = 62

● Oranges in the carton = 42

● Coconut in the carton = 10

● Pomegranate in the carton = 16

● Total fruits = 182

${\pmb{\frak{Central \: angle \: for \: Mangoes:}}}$

${\sf{:\implies Given \: Mangoes \: = 52}}$

${\sf{:\implies Fraction \: = \dfrac{52}{182}}}$

${\sf{:\implies Central \: angle \: = \dfrac{52}{182} \times 360}}$

${\sf{:\implies Central \: angle \: = 102.85}}$

${\pmb{\frak{Central \: angle \: for \: Apples:}}}$

${\sf{:\implies Given \: Apples \: = 62}}$

${\sf{:\implies Fraction \: = \dfrac{62}{182}}}$

${\sf{:\implies Central \: angle \: = \dfrac{62}{182} \times 360}}$

${\sf{:\implies Central \: angle \: = 122.63}}$

${\pmb{\frak{Central \: angle \: for \: Oranges:}}}$

${\sf{:\implies Given \: Oranges \: = 42}}$

${\sf{:\implies Fraction \: = \dfrac{42}{182}}}$

${\sf{:\implies Central \: angle \: = \dfrac{42}{182} \times 360}}$

${\sf{:\implies Central \: angle \: = 83.07}}$

${\pmb{\frak{Central \: angle \: for \: Coconut:}}}$

${\sf{:\implies Given \: Coconut \: = 10}}$

${\sf{:\implies Fraction \: = \dfrac{10}{182}}}$

${\sf{:\implies Central \: angle \: = \dfrac{10}{182} \times 360}}$

${\sf{:\implies Central \: angle \: = 19.78}}$

${\pmb{\frak{Central \: angle \: for \: Pomegranate:}}}$

${\sf{:\implies Given \: Pomegranate \: = 16}}$

${\sf{:\implies Fraction \: = \dfrac{16}{182}}}$

${\sf{:\implies Central \: angle \: = \dfrac{16}{182} \times 360}}$

${\sf{:\implies Central \: angle \: = 31.64}}$

We have done! Kindly see the pie chart from the given attachment. This is a rough diagram not proper as making from protector. But it correct. You can take idea from it that how to construct.