Maths-
General
Easy
Question
The cross-section of a swimming pool is a trapezium ABCD. AB=12m CD= 13 m DA= 5 m and the length of the pool is 60 m. Find the volume of water it holds?
- 4500
- 5400
- 6200
- 2600
The correct answer is: 2600
We have given the cross section of the swimming pool as ABCD.
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)
Related Questions to study
Maths-
A metal cube with a 6 cm edge is melted and cast into a cuboid whose base is 3.60x 0.60 cm2 .Calculate the height of the cuboid. Also, find the total surface area of the cuboid and cube respectively
A metal cube with a 6 cm edge is melted and cast into a cuboid whose base is 3.60x 0.60 cm2 .Calculate the height of the cuboid. Also, find the total surface area of the cuboid and cube respectively
Maths-General
Maths-
Determine if the given conjecture is true or not. Give a counterexample if it is false.
Given: ∠𝑃 𝑎𝑛𝑑 ∠𝑄 are complementary. ∠𝑄 𝑎𝑛𝑑 ∠𝑅 are complementary.
Conjecture: ∠𝑃 ≅ ∠𝑅
Determine if the given conjecture is true or not. Give a counterexample if it is false.
Given: ∠𝑃 𝑎𝑛𝑑 ∠𝑄 are complementary. ∠𝑄 𝑎𝑛𝑑 ∠𝑅 are complementary.
Conjecture: ∠𝑃 ≅ ∠𝑅
Maths-General
Maths-
A plate of 3 cm thick, 9 cm broad, and 27 m long is melted into a cube. find the difference in surface area of the two solids correct to the nearest whole number.
A plate of 3 cm thick, 9 cm broad, and 27 m long is melted into a cube. find the difference in surface area of the two solids correct to the nearest whole number.
Maths-General
Maths-
Which number is next in the sequence?
35, 85, 135, 185, __
Which number is next in the sequence?
35, 85, 135, 185, __
Maths-General
General
A cuboidal water tank is 6m long , 5m wide and 4.5 m deep.
How many litres of water can it hold ?
A cuboidal water tank is 6m long , 5m wide and 4.5 m deep.
How many litres of water can it hold ?
GeneralGeneral
Maths-
Show the conjecture is false by finding a counterexample.
Two supplementary angles form a linear pair.
Show the conjecture is false by finding a counterexample.
Two supplementary angles form a linear pair.
Maths-General
Maths-
Show the conjecture is false by finding a counterexample.
Two adjacent angles always form a linear pair
Show the conjecture is false by finding a counterexample.
Two adjacent angles always form a linear pair
Maths-General
Maths-
A cubical tank 50 cm in length and 36 cm in breadth contain water. A cube of x cm edge is dropped into it and fully immersed. If the rise in water level is 15 cm, solve for x. and hence find the T.S.A of the cubical tank
A cubical tank 50 cm in length and 36 cm in breadth contain water. A cube of x cm edge is dropped into it and fully immersed. If the rise in water level is 15 cm, solve for x. and hence find the T.S.A of the cubical tank
Maths-General
Maths-
Show the conjecture is false by finding a counterexample.
If the product of two numbers is even, then the two numbers must be even.
Show the conjecture is false by finding a counterexample.
If the product of two numbers is even, then the two numbers must be even.
Maths-General
Maths-
Show the conjecture is false by finding a counterexample.
If a + b = 0, then a = b = 0.
Show the conjecture is false by finding a counterexample.
If a + b = 0, then a = b = 0.
Maths-General
Maths-
calculate the surface area of a cube and volume of a cube with the given diagonal length of 15
cm
calculate the surface area of a cube and volume of a cube with the given diagonal length of 15
cm
Maths-General
Maths-
Show the conjecture is false by finding a counterexample.
If the product of two numbers is positive, then the two numbers must both be positive.
Show the conjecture is false by finding a counterexample.
If the product of two numbers is positive, then the two numbers must both be positive.
Maths-General
Maths-
Show the conjecture is false by finding a counterexample.
The square root of any positive integer x is always less than x.
Show the conjecture is false by finding a counterexample.
The square root of any positive integer x is always less than x.
Maths-General
Maths-
Show the conjecture is false by finding a counterexample.
All prime numbers are odd.
Show the conjecture is false by finding a counterexample.
All prime numbers are odd.
Maths-General
Maths-
Complete the conjecture.
The sum of the first n odd positive integers is ____.
Complete the conjecture.
The sum of the first n odd positive integers is ____.
Maths-General