Suppose we are given a weighted graph G(V,E).

The graph contains **N** vertices (*Numbered from 0 to N-1*) and *M Bidirectional edges* .

Each *edge(vi,vj)* has *postive distance d* (ie the distance between the two vertex vivj is d)

There is *atmost one edge between any two vertex* and also there is *no self loop* (ie.no edge connect a vertex to
itself.)

Also we are given **S** the source vertex and **D** the destination vertex.

let **Q** be the number of queries,each queries contains one edge **e(x,y)**.

For each query,We have to find the **shortest path from the source S to Destination D, assuming that edge (x,y) is absent in original graph.**
If no any path exists from S to D ,then we have to print No.

*Constraints are high 0<=(N,Q,M)<=25000*

**How to solve this problem efficiently?**

**Till now** what i did is implemented the simple *Dijakstra algorithm.*

For each Query Q ,everytime i am *assigning (x,y) to Infinity*
and *finding Dijakstra shortest path*.

But this approach will be very slow as overall complexity will be *Q*(time complexity of Dijastra Shortes path)*

Example::

```
N=6,M=9
S=0 ,D=5
(u,v,cost(u,v))
0 2 4
3 5 8
3 4 1
2 3 1
0 1 1
4 5 1
2 4 5
1 2 1
1 3 3
Total Queries =6
Query edge=(0,1) Answer=7
Query edge=(0,2) Answer=5
Query edge=(1,3) Answer=5
Query edge=(2,3) Answer=6
Query edge=(4,5) Answer=11
Query edge=(3,4) Answer=8
```