Let the functions $f :(-1,1) \rightarrow R$ and $g :(-1,1) \rightarrow(-1,1)$ be defined by
$f(x)=|2 x-1|+|2 x+1|$ and $g(x)=x-[x] \text {, }$
where $[ x ]$ denotes the greatest integer less than or equal to $x$. Let fog : $(-1,1) \rightarrow R$ be the composite function defined by $(f o g)(x)=f(g(x))$. Suppose $c$ is the number of points in the interval $(-1,1)$ at which fog is NOT continuous, and suppose $d$ is the number of points in the interval $(-1,1)$ at which fog is NOT differentiable. Then the value of $c + d$ is ____
$f(x)=|2 x-1|+|2 x+1|$ and $g(x)=x-[x] \text {, }$
where $[ x ]$ denotes the greatest integer less than or equal to $x$. Let fog : $(-1,1) \rightarrow R$ be the composite function defined by $(f o g)(x)=f(g(x))$. Suppose $c$ is the number of points in the interval $(-1,1)$ at which fog is NOT continuous, and suppose $d$ is the number of points in the interval $(-1,1)$ at which fog is NOT differentiable. Then the value of $c + d$ is ____
Correct Answer: 4
Solution and Explanation
Answer: \(c + d = 4\)
Top Questions on Functions
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Questions Asked in JEE Advanced exam
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Concepts Used:
Functions
A function is a relation between a set of inputs and a set of permissible outputs with the property that each input is related to exactly one output. Let A & B be any two non-empty sets, mapping from A to B will be a function only when every element in set A has one end only one image in set B.
Kinds of Functions
The different types of functions are -
One to One Function: When elements of set A have a separate component of set B, we can determine that it is a one-to-one function. Besides, you can also call it injective.
Many to One Function: As the name suggests, here more than two elements in set A are mapped with one element in set B.
Moreover, if it happens that all the elements in set B have pre-images in set A, it is called an onto function or surjective function.
Also, if a function is both one-to-one and onto function, it is known as a bijective. This means, that all the elements of A are mapped with separate elements in B, and A holds a pre-image of elements of B.
Read More: Relations and Functions