CBSE Class 12 Math 2013 Solved Paper - Question 13 | ExamSiri

CBSE Class 12 Math 2013 Solved Paper

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Question : 13 of 29

Marks: +1, -0

Using properties of determinants prove the following:

|\table 1,x,x^2;x^2,1,x;x,x^2,1|

=

(1-x^3)^2

Solution:

|\table 1,x,x^2;x^2,1,x;x,x^2,1|

Applying

R_1

→

R_1 + R_2 + R_3

, we have:
Δ =

|\table 1+x+x^2,1+x+x^2,1x+x+x^2;x^2,1,x;x,x^2,1|

= 1 + x +

x^2

|\table 1,1,1;x^2,1,x;x,x^2,1|

Applying

C_2

→

C_2 − C_1

and

C_3

→

C_3 − C_1

, we have:
Δ = 1 + x +

x^2

|\table 1,0,0;x^2,1-x^2,x-x^2;x,x^2-x,1-x|

= (1 + x +

x^2

) (1 - x) (1 - x)

|\table 1,0,0;x^2,1+x,x;x,-x,1|

= (1 -

x^3

) (1 - x)

|\table 1,0,0;x^2,1+x,x;x,-x,1|

Expanding along

R_1

, we have:
Δ = (1 -

x^3

) (1 - x) (1)

|\table 1+x,x;-x,1|

= (1 -

x^3

) (1 - x) (1 + x +

x^2

)
= (1 -

x^3

) (1 -

x^2

)
=

(1 - x^3)^2

Hence proved.

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