Match the following
| A | Stok's Theorem | 1 | \(\oint D.ds = Q\) |
| B | Gauss's theorem | 2 | \(\oint \vec A \cdot d\vec l=\iint \left( {\vec \nabla \times \vec A} \right).d\vec s\) |
| C | Cauchy's integral theorem | 3 | \(\mathop \oint \limits_s \vec F.d\vec s = \mathop \smallint \limits_v \left( {\vec \nabla .\vec F} \right)dv\) |
| D | Divergence theorem | 4 | \(\oint f\left( z \right).dz = 0\) |
1
A – 1, B – 2, C – 4, D – 3
2
A – 2, B – 1, C – 4, D – 3
3
A – 3, B – 3, C – 1, D – 2
4
A – 4, B – 1, C – 2, D – 3