In a third order determinant, each eleme...

In a third order determinant, each element of the first column consists of sum oftwo terms, each element of the second column consists of sum of three terms and each element of the third column consits of sum of four terms, Then it can be decomposed into four terms,.Then it can be decomposed into n determinants, where n has value

Similar Questions

Explore conceptually related problems

In a third order determinant, each element of first column consists of sum of two terms, each element of the second column consists of sum of three terms and each element of the third column consists of sum of four terms. Then it can be decomposed into n determinants, where n has the value a)1 b)9 c)16 d)24

The sum of the first three terms of an A.P. is 9 and the sum of their squares is 35. The sum to first n terms of the series can be

IF the coafactor and minor of each element of a second order determinant are same, then what is the value of the element is the second row and first column of determinant.

If each element of a row is expressed as sum of two elements then verify for a third order determinant that the determinant can be expressed as sum of two determinants.

An AP consists of 23 terms. If the sum of the three terms of in the middle is 141 and the sum of the last three terms is 261 , then the first term is

An AP consists of 23 terms. If the sum of the three terms in the middle is 141 and the sum of the last three terms is 261, then the first term is

An A.P. consists of n terms. If the sum of its first three terms is x and the sum of the last three terms is y, then show that, the sum of all the terms of the A.P. is (n)/(6)(x+y) .

Similar Questions

Recommended Questions