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Recent activity by pradeedppsd
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username change
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how could i change my username???
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Sep 13, 2017
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GATE IT 2005 | Question: 13
A function $f$ defined on stacks of integers satisfies the following properties. $f(∅) = 0$ and $f (push (S, i)) = max (f(S), 0) + i$ for all stacks $S$ and integers $i$. If a stack $S$ contains the integers $2, -3, 2, -1, 2$ in order from bottom to top, what is $f(S)$? $6$ $4$ $3$ $2$
A function $f$ defined on stacks of integers satisfies the following properties. $f(∅) = 0$ and $f (push (S, i)) = max (f(S), 0) + i$ for all stacks $S$ and integers $i...
17.6k
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commented
Sep 13, 2017
DS
gateit-2005
data-structures
stack
normal
+
–
9
answers
3
GATE CSE 2012 | Question: 38
Let $G$ be a complete undirected graph on $6$ vertices. If vertices of $G$ are labeled, then the number of distinct cycles of length $4$ in $G$ is equal to $15$ $30$ $90$ $360$
Let $G$ be a complete undirected graph on $6$ vertices. If vertices of $G$ are labeled, then the number of distinct cycles of length $4$ in $G$ is equal to$15$$30$$90$$36...
35.0k
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commented
Jul 14, 2017
Graph Theory
gatecse-2012
graph-theory
normal
marks-to-all
counting
+
–
8
answers
4
GATE CSE 2006 | Question: 73
The $2^n$ vertices of a graph $G$ corresponds to all subsets of a set of size $n$, for $n \geq 6$. Two vertices of $G$ are adjacent if and only if the corresponding sets intersect in exactly two elements. The number of connected components in $G$ is: $n$ $n + 2$ $2^{\frac{n}{2}}$ $\frac{2^{n}}{n}$
The $2^n$ vertices of a graph $G$ corresponds to all subsets of a set of size $n$, for $n \geq 6$. Two vertices of $G$ are adjacent if and only if the corresponding set...
8.8k
views
commented
Jul 14, 2017
Graph Theory
gatecse-2006
graph-theory
normal
graph-connectivity
+
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