Math, asked by chintapallineeraja, 5 months ago

a³+2a²-3a and 2a³+5a²-3a hcf​

Answers

Answered by Anonymous
10

Answer:

Answer:< br/ > ∠AsinAcosAtanAcosecAsecAcotA 0 ∘ 010NotDefined1NotDefined 30 ∘ 21 23 3 1 23 2 3 45 ∘ 2 1 ... More

Answered by Anonymous
0

Answer:

If a+b+c=1 , a²+b²+c²=2 , a³+b³+c³=3 then what is the value of a⁴+b⁴+c⁴?

If a+b+c=1, a2+b2+c2=2, a3+b3+c3=3 then what is the value of a4+b4+c4?

Using the identity,

a4+b4+c4=

(a2+b2+c2)22

+(4)(a+b+c)(a3+b3+c3)3

+(a+b+c)46

−(a+b+c)2(a2+b2+c2)

for this problem,

a4+b4+c4=(2)22+(4)(1)(3)3+(1)46−(1)2(2)=256

In case you wondered how I came up with that identity, I’ll tell you. No clever uses of roots of polynomials or clever mathematical tricks are needed, just brute force. I used Wolfram Alpha to expand

(w)(a2+b2+c2)2

+(x)(a+b+c)(a3+b3+c3)

+(y)(a+b+c)4

+(z)(a+b+c)2(a2+b2+c2)

and then I gathered together the terms like this:

(a4+b4+c4)(w+x+y+z)

+(a3b+a3c+b3a+b3c+c3a+c3b)(x+4y+2z)

+(a2bc+b2ac+c2ab)(12y+2z)

+(a2b2+b2c2+a2c2)(2w+6y+2z)

The coefficient of the first group of terms should be 1, and the coefficient of all the other terms should be zero, because I want the whole thing to add up to a4+b4+c4, so this gives me the following equations:

w+x+y+z=1

x+4y+2z=0

12y+2z=0

2w+6y+2z=0

Which then I solve using Cramer’s method, giving me w=12, x=43, y=16, and z=−1. The identity follows.

A variant of this approach will work to find any similar identity, if it exists.

Step-by-step explanation:

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