Question

यदि x, y, z शून्येतर वास्तविक संख्याएँ हों तो आव्यूह A = `[(x,0,0),(0,y,0),(0,0,z)]` का व्युत्क्रम है:

Options

• `[(x^-1,0,0),(0,y^-1,0),(0,0,z^-1)]`

• `xyz[(x^-1,0,0),(0,y^-1,0),(0,0,z^-1)]`

• `1/(xyz)[(x,0,0),(0,y,0),(0,0,z)]`

• `1/(xyz)[(1,0,0),(0,1,0),(0,0,1)]`

Answer 1

`[(x^-1,0,0),(0,y^-1,0),(0,0,z^-1)]`

स्पष्टीकरण:

माना, A = `[(x,0,0),(0,y,0),(0,0,z)]`

∴ |A| = x[yz - 0] = xyz

∴ `A_11 = (-1)^{1 + 1}[(y,0),(0,z)] = (-1)^2[yz - 0]`

= 1 × yz = yz

`A_12 = (-1)^{1 + 2}[(0,0),(0,z)] = (-1)^3[0 - 0] = 0`

`A_13 = (-1)^{1 + 3}[(0,y),(0,0)] = (-1)^4[0 - 0] = 0`

`A_21 = (-1)^{2 + 1}[(0,0),(0,z)] = (-1)^3[0 - 0] = 0`

`A_22 = (-1)^{2 + 2}[(x,0),(0,z)] = (-1)^4[xz - 0] = 0`

= 1 × zx = zx

`A_23 = (-1)^{2 + 3}[(x,0),(0,0)] = (-1)^5[0 - 0] = 0`

`A_31 = (-1)^{3 + 1}[(0,0),(0,z)] = (-1)^4[0 - 0] = 0`

`A_32 = (-1)^{3 + 2}[(x,0),(0,0)] = (-1)^5[0 - 0] = 0`

`A_33 = (-1)^{3 + 3}[(x,0),(0,y)] = (-1)^6[xy - 0] = xy`

∴ adj A = `[(yz,0,0),(0,zx,0),(0,0,xy)] = [(yz,0,0),(0,zx,0),(0,0,xy)]`

`A^-1 = 1/|A|(adj A) = 1/(xyz)[(yz,0,0),(0,zx,0),(0,0,xy)]`

= `[(1/x,0,0),(0,1/y,0),(0,0,1/z)] = [(x^-1,0,0),(0,y^-1,0),(0,0,z^-1)]`

अतः विकल्प `underline([(x^-1,0,0),(0,y^-1,0),(0,0,z^-1)])` सही है।