Maths-
General
Easy
Question
iv in roman number is
- 4
- 5
- 7
- 6
The correct answer is: 4
V= 5 , I = 1
We subtract the smaller value in the left, therefore 5-1 = 4
Related Questions to study
Maths-
There are two circle with same centre O. The radius of larger circle is 4cm and that of the smaller circle is 2cm.
Find area of the shaded region.
![](data:image/png;base64,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)
Find area of the shaded region.
There are two circle with same centre O. The radius of larger circle is 4cm and that of the smaller circle is 2cm.
Find area of the shaded region.
![](data:image/png;base64,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)
Find area of the shaded region.
Maths-General
Maths-
What is 9 divided by 72
What is 9 divided by 72
Maths-General
Maths-
12 divided by 26
12 divided by 26
Maths-General
Maths-
Aman bought an bike for Rs. 20,000 and sold it to Raman and earn a profit of 2,000. So, at what amount Aman sold the bike to Raman.
Aman bought an bike for Rs. 20,000 and sold it to Raman and earn a profit of 2,000. So, at what amount Aman sold the bike to Raman.
Maths-General
Maths-
Write 24 in roman numerals
Write 24 in roman numerals
Maths-General
Maths-
What value of x satisfies 2x + 3 = 9
What value of x satisfies 2x + 3 = 9
Maths-General
Maths-
Two angles are supplementary and one exceeds the other by 10 degree. Find the angles.
Two angles are supplementary and one exceeds the other by 10 degree. Find the angles.
Maths-General
Maths-
1023+356
1023+356
Maths-General
Maths-
Is 71 prime
Is 71 prime
Maths-General
Maths-
which multiplication property states that,”The mode of grouping the factors does not change the result of the multiplication”.
which multiplication property states that,”The mode of grouping the factors does not change the result of the multiplication”.
Maths-General
Maths-
Write 3.6 as fraction
Write 3.6 as fraction
Maths-General
Maths-
what is the opposite integer of 4:
what is the opposite integer of 4:
Maths-General
Maths-
7/3 divided by 1 is
7/3 divided by 1 is
Maths-General
Maths-
What is the area of triangle whole base is 3m and height is 12m
What is the area of triangle whole base is 3m and height is 12m
Maths-General
Maths-
What is the greatest common factor of 12 and 36
What is the greatest common factor of 12 and 36
Maths-General