Maths-
General
Easy
Question
If 8'C represents 8'C above freezing point, then what will 16'C below freezing point represent?
- 16`C
- -16`C
- 0
- None of the above
The correct answer is: -16'C
-16'C
Related Questions to study
Maths-
If 1/6 of a number is 240. Find the number:
If 1/6 of a number is 240. Find the number:
Maths-General
Maths-
Find the area of the triangle whose base and height are 16cm and 8cm.
![](data:image/png;base64,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)
Find the area of the triangle whose base and height are 16cm and 8cm.
![](data:image/png;base64,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)
Maths-General
Maths-
LCM and HCF of two numbers is equal to 75 and 5 . If one number is 15, find the other one.
LCM and HCF of two numbers is equal to 75 and 5 . If one number is 15, find the other one.
Maths-General
Maths-
Find the range of the following data: 25, 22, 24, 30, 10, 12,32, 40
Find the range of the following data: 25, 22, 24, 30, 10, 12,32, 40
Maths-General
Maths-
¼ litre of milk cost Rs 15/2 . Find the cost of 9/2 litre of milk.
¼ litre of milk cost Rs 15/2 . Find the cost of 9/2 litre of milk.
Maths-General
Maths-
If a polygon has 5 sides(pentagon) than what will be the sum of its interior angles:
If a polygon has 5 sides(pentagon) than what will be the sum of its interior angles:
Maths-General
Maths-
If all the sides of triangle ,so the triangle is called __________ triangle:
If all the sides of triangle ,so the triangle is called __________ triangle:
Maths-General
Maths-
which of these is a factor of 6:
which of these is a factor of 6:
Maths-General
Maths-
In an office, there are 6000 employees. If 2000 of them are male employees, find the ratio of no. of male employees to the no female employees:
In an office, there are 6000 employees. If 2000 of them are male employees, find the ratio of no. of male employees to the no female employees:
Maths-General
Maths-
The area of a rectangular park is 1500 sq m. If the lenth is 50m, find its width. Also find the perimeter of the park.
The area of a rectangular park is 1500 sq m. If the lenth is 50m, find its width. Also find the perimeter of the park.
Maths-General
Maths-
What will we get when we divide 4 by 6:
What will we get when we divide 4 by 6:
Maths-General
Maths-
Divide 26.4 by 4:
Divide 26.4 by 4:
Maths-General
Maths-
What will be the opposite integer of 12:
What will be the opposite integer of 12:
Maths-General
Maths-
The area of a rectangular park is 2000 m2 . If its length is 50m , find its width.
The area of a rectangular park is 2000 m2 . If its length is 50m , find its width.
Maths-General
Maths-
Himani saves Rs 700 a month and pratibha saves Rs 900 a month. Find the ratio in their savings.
Himani saves Rs 700 a month and pratibha saves Rs 900 a month. Find the ratio in their savings.
Maths-General