Mathematics
Grade-4-
Easy
Question
Round the decimal in the figure to its nearest tenths.
![](data:image/png;base64,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)
- 0.1
- 0.2
- 0.3
- 0.4
Hint:
We have to find the decimal number showed in the figure and then round off it to nearest tenth. At first we will start with finding the decimal number formed in figure, considering all boxes together to be a whole 1, then we can see that only 44 boxes is colored so the number formed will be 0.44. Further we will round off the tenth place which is first digit on right of decimal point as the number after 4 is 4 so the 4 will remain as 4.
The correct answer is: 0.4
decimal number formed= 0.44
decimal number rounded off to nearest tenth = 0.4
Related Questions to study
Mathematics
Round the decimal in the figure to its nearest tenths.
![](data:image/png;base64,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)
Round the decimal in the figure to its nearest tenths.
![](data:image/png;base64,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)
MathematicsGrade-4-
Mathematics
Round off the decimal – 456.8745 to nearest integer.
Round off the decimal – 456.8745 to nearest integer.
MathematicsGrade-4-
Mathematics
Round off the decimal 123.4896 to its nearest tenth.
Round off the decimal 123.4896 to its nearest tenth.
MathematicsGrade-4-
Mathematics
The pair of fractions among the following that are not equivalent is
The pair of fractions among the following that are not equivalent is
MathematicsGrade-4-
Mathematics
Convert the fraction
into decimal form.
Convert the fraction
into decimal form.
MathematicsGrade-4-
Mathematics
Convert the decimal 1.5 into the fraction.
HCF is the highest common factor.
Convert the decimal 1.5 into the fraction.
MathematicsGrade-4-
HCF is the highest common factor.
Mathematics
The fraction that is equivalent to
is
The fraction that is equivalent to
is
MathematicsGrade-4-
Mathematics
Convert the decimal 0.2 into a fraction.
HCF :- Highest Common Factor
Convert the decimal 0.2 into a fraction.
MathematicsGrade-4-
HCF :- Highest Common Factor
Mathematics
Convert the fraction
into the decimal.
Convert the fraction
into the decimal.
MathematicsGrade-4-
Mathematics
If a game of chance consists of spinning an arrow which is equally likely to come to rest pointing to one of the number 1,2,3……12 , then the probability that it will point to an odd number is:
Odd number is the numbers which are not divisible by 2.
If a game of chance consists of spinning an arrow which is equally likely to come to rest pointing to one of the number 1,2,3……12 , then the probability that it will point to an odd number is:
MathematicsGrade-4-
Odd number is the numbers which are not divisible by 2.
Mathematics
In a lottery there are 15 prizes and 30 blanks. A lottery is drawn at random. Then, the probability of a getting prize is_____.
In a lottery there are 15 prizes and 30 blanks. A lottery is drawn at random. Then, the probability of a getting prize is_____.
MathematicsGrade-4-
Mathematics
There are 2 yellow marbles, 4 red marbles, 6 blue marbles, and 3 green marbles in a bag. Miguel will choose a marble at random from the bag. The probability to get yellow marble is _________.
There are 2 yellow marbles, 4 red marbles, 6 blue marbles, and 3 green marbles in a bag. Miguel will choose a marble at random from the bag. The probability to get yellow marble is _________.
MathematicsGrade-4-
Mathematics
The chance of throwing 6 with an ordinary dice is_______.
The chance of throwing 6 with an ordinary dice is_______.
MathematicsGrade-4-
Mathematics
From a bag of 3 red, 3 blue, 4 white balls. A ball is picked at random. The probability to get white ball is_________.
From a bag of 3 red, 3 blue, 4 white balls. A ball is picked at random. The probability to get white ball is_________.
MathematicsGrade-4-
Mathematics
In a box, there are 6 red, 7 blue and 8 green balls. One ball is picked up randomly. The probability that the ball drawn is neither red nor blue is_____.
In a box, there are 6 red, 7 blue and 8 green balls. One ball is picked up randomly. The probability that the ball drawn is neither red nor blue is_____.
MathematicsGrade-4-