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Syllabus

Using properties of determinants prove that -

(b+c)

^{2}....a^{2}........a^{2}b

^{2}.....(c+a)^{2.}.....b^{2}=2abc(a+b+c)^{3}c

^{2}.....c^{2}.......(a+b)^{2}In this ques.. i just want to know tht after applying C

_{1}→ C_{1}-C_{2}, C_{2}→ C_{2}-C_{3}in this ques how can i take (a+b+c) common from C

_{1}and C_{2}.Solve this :$2.\mathrm{If}{\mathrm{D}}_{1}=\left|\begin{array}{ccc}{\mathrm{ab}}^{2}-{\mathrm{ac}}^{2}& {\mathrm{bc}}^{2}{\mathrm{a}}^{2}\mathrm{b}& {\mathrm{a}}^{2}\mathrm{c}-{\mathrm{b}}^{2}\mathrm{c}\\ \mathrm{ac}-\mathrm{ab}& \mathrm{ab}-\mathrm{bc}& \mathrm{bc}-\mathrm{ac}\\ \mathrm{c}-\mathrm{b}& \mathrm{a}-\mathrm{c}& \mathrm{b}-\mathrm{a}\end{array}\right|{\mathrm{D}}_{2}=\left|\begin{array}{ccc}1& 1& 1\\ \mathrm{a}& \mathrm{b}& \mathrm{c}\\ \mathrm{bc}& \mathrm{ac}& \mathrm{ab}\end{array}\right|,\mathrm{then}{\mathrm{D}}_{1}{\mathrm{D}}_{2}\mathrm{is}\mathrm{equal}\mathrm{to}-\phantom{\rule{0ex}{0ex}}\left(\mathrm{a}\right)0\left(\mathrm{b}\right){\mathrm{D}}_{1}^{2}\left(\mathrm{c}\right){\mathrm{D}}_{2}^{2}\left(\mathrm{d}\right){\mathrm{D}}_{2}^{3}$

if A is a square matrix of order 3, such that / adj.A / = 64 . then find / A' / .

Prove that

| (b+c)^2 a^2 a^2 |

| b^2 (c+a)^2 b^2 | = 2abc(a+b+c)^3

| c^2 c^2 (a+b)^2 |

^{3}- b^{3}-c^{3}5.Three schools A, B and C want to award their selected students for the values of honesty, regularity and hard work. Each school decided to award a sum of Rs. 2500, Rs. 3100, Rs. 5100 per student for the respective values. The number of students to be awarded by the three schools as given below:A = 50500, 40800, 41600

If a,b,c, all positive ,are pth,qth and rth terms of G.P. , prove that determinant [ log a p 1

log b q 1 = 0

log c r 1 ]

a

^{2}2ab b^{2}b

^{2}a^{2}2ab = (a^{3}+b^{3})^{2}2ab b

^{2}a^{2}if a is a square matrix of order 3 and / 3A / = k/A/ find value of k? pls fast plss

Prove that the following determinant is equal to (ab + bc + ca)

^{3 :}-bc b

^{2}+ bc c^{2}+ bca

^{2}+ ac -ac c^{2}+ aca

^{2}+ ab b^{2}+ ab -abDifference between cramer's rule and Matrix method.....and when to use which one.....

A matrix of order 3X3 has determinant 5. What is the value of |3A|?

265 240 219

240 225 198

219 198 181

=0

1. Using properties of determinants, prove the following:

| x y z

x

^{2}y^{2}z^{2}x

^{3}y^{3}z^{3 | = }xyz(x - y)(y - z)(z - x) .2. Using properties of determinants, prove the following :

| x x

^{2}1+px^{3}y y

^{2}1+py^{3}z z

^{2}1+pz^{3}| = (1+ pxyz)(x - y)(y - z)(z - x) .If det [ p b c

a q c = 0 then find (p/p-a) + (q/q-b) + (r/r-c)

a b r]

PROVE THAT THE DETERMINANT

b

^{2}+c^{2}ab acab c

^{2}+a^{2 }bcac bc a

^{2}+b^{2}is equal to 4a

^{2}b^{2}c^{2}in properties of determinants how do we apply c1-c1+c2+c3 or ri-r1+r2+r3 in any row or column plz xplain wid an example

state any short tricks to solve prob. on properties of determinant. and identify how to solve it by slight seeing????????

A = [ 2 -3

3 4 ]

satisfies the equation x^2 - 6x + 17 = 0. Hence find A^-1.

| b^2 +c^2 ab ac |

| ab c^2+a^2 bc |=4a^2b^2c^2

| ca cb a^2+ b^2|

To prove :

(b+c)

^{2}a^{2}a^{2}b

^{2}(c+a)^{2}b^{2}= 2abc(a+b+c)^{3}b

^{2}c^{2}(a+b)^{2}Using properties of determinants, solve the following for x :

x-2 2x-3 3x-4

x-4 2x-9 3x-16 =0

x-8 2x-27 3x-64

solve the determinant

0 ab

^{2}ac^{2}a

^{2}b 0 bc^{2}a

^{2}c cb^{2 }0prove without expanding that the determinant equals 0

b2c2 bc b-c

c2a2 ca c-a

a2b2 ab a-b

$A=\left[\begin{array}{ccc}1& 0& 0\\ 0& 1& 1\\ 0& -2& 4\end{array}\right],I=\left[\begin{array}{ccc}1& 0& 0\\ 0& 1& 0\\ 0& 0& 1\end{array}\right]\phantom{\rule{0ex}{0ex}}\phantom{\rule{0ex}{0ex}}{A}^{-1}=\frac{1}{6}\left({A}^{2}+CA+dI\right)\phantom{\rule{0ex}{0ex}}Wherec,d\in R,thenpairofvaluesofcanddare.$

py+z y z

0 px+y py+z

= 0

where p is any real number

|b+c a a |

| b c+a b |=4abc

| c c a+b |

for any 2*2 matrix A, if A(adjA) = [10 0] find A determinant....?

[0 10]

Please solve the following determinant based question | (y+z)^2 xy zx |

| xy (x+z)^2 yz | = 2xyz(x+y+z)^3 .

| xz yz (x+y)^2 |

Please give the answer fast !!

A is a square matrix of order 3 and det. A = 7. Write the value of adj A.

Please give me any formula or method for calculating this problem.

Using properties of determinats, prove that

a

^{2 }2ab b^{2}b

^{2 }a^{2 }2ab2ab b

^{2 }a^{2 }= (a

^{3}+ b^{3})^{2}(a

^{2}+ b^{2})/c c ca (b

^{2}+ c^{2})/a a = 4abcb b ( c

^{2}+ a^{2})/b|2 y 3|

|1 1 z|

xyz=80 and 3x+2y+10z=20

Find value of A(adjA)

px+y x y

py+z y z = 0

0 px+y py+z

Please explain using graph.

1. A square matrix A, of order 3, has |A|=5, find |A adj. A|.

What is the formula for Det[ adj( adj(A) ) ] and how do you derive it ?

| x+a b c|

| b. x+c. a|. =. 0 is -(a+b+c).

| c. a x+b|

An amount of Rs. 10,000 is put into three investments at the rate of 10,12 and 15 per cent per annum. The combined income is Rs. 1,310 and the combined income of the first and the second investment is Rs. 190 short of the income from the third.

i) Represent the above situation by matrix equation and form the linear equation using multiplication.

ii) Is it possible to solve the system of equations so obtained using matrices?

Show that the elements along the main diagonal of a skew symmetric matrix are all zero.

Pls. answer

easy way to solve elementary row or column transformation

prove that the 3x3 determinant :

| 1+a

^{2}-b^{2}2ab -2b || 2ab 1-a

^{2}+b^{2}2a | = (1+a^{2}+b^{2})^{3 }| 2b -2a 1-a

^{2}-b^{2}|-1010-4040solve the system of equations

x-y+2z=1

2y-3z=1

3x-2y+4z=2

how to solve determinant of 4x4 matrix?

For what values of a and b, the following system of equations is consistent?

x+y+z=6

2x+5y+az=b

x+2y+3z=14 [by matrix method]

If A is an invertible matrix of order 3 and |A|=5, then find |adj A|

Using the properties of determinants, prove that:

1 bc bc(b+c)

1 ca ca(c+a) = 0

1 ab ab(a+b)

subscriber. She proposes to increase the annual subscription charges and it is believed that for

every increase of Re 1, one subscriber will discontinue. What increase will bring maximum

income to her? Make appropriate assumptions in order to apply derivatives to reach the

solution. Write one important role of magazines in our lives.

a b-c c+b

a+c b c-a

a-b b+a c =(a+b+c)(a^2+b^2+c^2)

if A is a square matrix of order 3 such that adj(2A) = k adj(A) , then wite the value of k..

prove that determinant of x x

^{2 }yzy y

^{2}zx = (x-y)(y-z)(z-x)(xy+yz+zx)z z

^{2}xy^{T}|Determinants cube root of unity question: Evaluate:| 1 w

^{3 }w^{5}||w

^{3 }1 w^{4}||w

^{5}w^{5}1 |, where w is an imaginary cube root of unity.

(I know the answer is 0 but how do you solve this determinant?)

Evaluate the following determinants:

bar of (log

_{a}b 1)(1 log

_{b}a)if a,b,c are all positive and are pth,qth,rth terms of a G.P, then show that determinant

|log a p 1|

| log c r 1|

prove that a+b+2c a b

c b+c+2a b = 2( a+b+c)

^{3}c a c+a+2b

Using the properties of determinants ,show that

0 p-q p-r

q-p 0 q-r

r-p r-q 0

=0..

Solve:

(i) x+y-2z =0 (ii)2x+3y+4z =0 (iii)3x+y+z =0 (iv) x+2y-3z = -4

2x+y-3z =0 x+y+z =0 x-4y+3z =02x+3y+2z =2

5x+4y-9z =0 2x-y+3z =0 2x+5y-2z =0 3x-3y-4z =11

why we have

inused 1 (n only 1) not zero or anything else?...triangle law of determinantdeterminant {5

^{2}5^{3}5^{4}5

^{3}5^{4}5^{5}5

^{4}5^{5}5^{6}}find the value of determinantIf x + y + z = 0, prove that|xa yb zc| |a b c||yc za xb|= xyz |c a b||zb xc ya| |b c a|

Iwant the answer within 2 hours.Please!!!!!!

SHOW THAT :

DETERMINANT OF :

X X

^{2}X^{3}-1Y Y

^{2}Y^{3}-1 = 0Z Z

^{2 }Z^{3}-1let A is a matrix of order 3.write the value of |2a| where |A|=4

1 a a

^{2 }-bc1 b b

^{2 }-ca1 c c

^{2 }-abis 0.