Maths-
General
Easy
Question
![3 over 2](data:image/png;base64,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)
- 0
![2 over 3](data:image/png;base64,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)
![1 third](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAKNJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYLcATibUD8DYh/APEtIJ4AxMKkGrQfiIOAmA1JzACId1DLpZ+oYYgSEN+gxABxIE6EhpMXNbJMAaVeEgTiACA+CcT21AgjHqhhVAE/qGGIHjTASQIHgTgUiFmAmAma0u8DcTypBtkC8RaoV35AU7oPPg0ArQs4erRAu/EAAABidEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj4xPC9tbj48bW4+MzwvbW4+PC9tZnJhYz48L21hdGg+q+QgMwAAAABJRU5ErkJggg==)
The correct answer is: ![2 over 3](data:image/png;base64,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)
Related Questions to study
chemistry-
Which compound will have highest boiling point?
Which compound will have highest boiling point?
chemistry-General
chemistry-
In the reaction,
A and B are
In the reaction,
A and B are
chemistry-General
chemistry-
Correct acidic order of the following compounds is ![](data:image/png;base64,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)
Correct acidic order of the following compounds is ![](data:image/png;base64,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)
chemistry-General
chemistry-
Which of the following reactions does not yield an ether?
Which of the following reactions does not yield an ether?
chemistry-General
maths-
There are 10 points in a plane and A is one of them If no three of the points are collinear then the number of triangles formed with A as vertex is
There are 10 points in a plane and A is one of them If no three of the points are collinear then the number of triangles formed with A as vertex is
maths-General
maths-
The maximum number of points of intersection of 8 circles is
The maximum number of points of intersection of 8 circles is
maths-General
maths-
The maximum number of points of intersection of 8 straight lines is
The maximum number of points of intersection of 8 straight lines is
maths-General
Maths-
A question paper consisting of 10 questions is divided into 3 parts with 5, 3,2 questions A candidate is to answer 6 questions without neglecting any part The number of ways in which he can make up his choice is
A question paper consisting of 10 questions is divided into 3 parts with 5, 3,2 questions A candidate is to answer 6 questions without neglecting any part The number of ways in which he can make up his choice is
Maths-General
Maths-
A guard of 12 men is formed form soldiers If A and B are three times as often together on guard as C,D, E then =
A guard of 12 men is formed form soldiers If A and B are three times as often together on guard as C,D, E then =
Maths-General
maths-
An examination paper, which is divided into two groups consisting of 3 and 4 questions respectively carries the note it is not necessary to answer all the questions One question atleast should be answered form each group The number of ways can an examinee select the questions is
An examination paper, which is divided into two groups consisting of 3 and 4 questions respectively carries the note it is not necessary to answer all the questions One question atleast should be answered form each group The number of ways can an examinee select the questions is
maths-General
Maths-
From a council of 7 Hindus, 5 Muslims and 4 Christians a committee of 5 is to be formed with 1 Christian and at least two Hindus The number of ways of forming the committee is
From a council of 7 Hindus, 5 Muslims and 4 Christians a committee of 5 is to be formed with 1 Christian and at least two Hindus The number of ways of forming the committee is
Maths-General
maths-
maths-General
maths-
A person wishes to make up as many different parties of 10 as he can out of 20 friends, each party consisting of the same number In how many of the parties the same man is found ?
A person wishes to make up as many different parties of 10 as he can out of 20 friends, each party consisting of the same number In how many of the parties the same man is found ?
maths-General
Maths-
A father with 6 children takes 3 at a time to a park without taking the same children How often each child goes to the park?
A father with 6 children takes 3 at a time to a park without taking the same children How often each child goes to the park?
Maths-General
chemistry-
Action of
gives:
Action of
gives:
chemistry-General