Question
Write the percent for shaded portion
![](data:image/png;base64,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)
- 40%
- 50%
- 80%
- 60%
Hint:
Fractions are represented as a numerical value, which defines a part of a whole. A fraction can be a portion or section of any quantity out of a whole, where the whole can be any number, a specific value, or a thing. Let us understand this concept using an example. A pizza that is divided into 8 equal parts. Now, if we want to express one selected part of the pizza, we can express it as 1/8 which shows that out of 8 equal parts, we are referring to 1 part.
The correct answer is: 50%
Here, Shaded potion =
, that is out of 8 parts, 4parts are shaded.
To convert fraction into percent multiply by 100 and add symbol %
![4 over 8 space c a n space a l s o space b e space w r i t t e n space a s space 1 half space left parenthesis space bold italic E bold italic q bold italic u bold italic i bold italic v bold italic a bold italic l bold italic e bold italic n bold italic t bold space bold italic f bold italic r bold italic a bold italic c bold italic t bold italic i bold italic o bold italic n bold italic s right parenthesis
1 half cross times 100 equals space 50 straight percent sign
Thus comma 50 percent sign space is space the space shaded space portion.](data:image/png;base64,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Related Questions to study
On a recent survey, 40% of those surveyed indicated that they preferred walking to running. If 540 people preferred walking, find the total people were surveyed?
On a recent survey, 40% of those surveyed indicated that they preferred walking to running. If 540 people preferred walking, find the total people were surveyed?
_____________%
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16 is 25% of what number?
The final answer is a number and shouldn’t have a percentage sign. The given options have been given in percentage form by mistake.
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33 is 75% of what number?
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Patricia have finished
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We assume that the portion of pizza that Patricia had i.e. 2/8 represents 2 pieces of the total 8 pieces in the pizza.
i.e. we assume tat there were total 8 pieces in the pizza.
Patricia have finished
of her pizza remaining she has left for her brother. What percent of pizza did Patricia’s brother get
We assume that the portion of pizza that Patricia had i.e. 2/8 represents 2 pieces of the total 8 pieces in the pizza.
i.e. we assume tat there were total 8 pieces in the pizza.