Respuesta :
Answer:
Step-by-step explanation:
a.
1
1 2 1
1 3 3 1
1 4 6 4 1
(x+y)^4=1 x^4+4x³y+6 x²y²+4xy3 +1y^4
=x^4+4x³y+6x²y2+4xy³+y^4
or
(x+y)^4=4c0 x^4+4c1 x³y+4c2x²y²+4c3xy³+4c4y^4
4c0=4c4=1
4c1=4/1=4
4c2=(4×3)/(2×1)=6
4c3=4c1=4
so \[(x+a)^4=x^4+4x³y+6x²y²+4xy³+y^4\]
b.
\[(x+2y)^4=x^4+4x³(2y)+6x²(2y)^2+4x(2y)³+(2y)^4\]
=x^4+8x³y+24x²y²+32xy³+16y^4
c.
(x+2x)^4=(3x)^4=81x^4
or(x+2x)^4=x^4+4x³(2x)+6x²(2x)²+4x(2x)³+(2x)^4
=x^4+8x^4+24x^4+32x^4+16x^4
=81x^4
d.
(x-y)^4=x^4+4x³(-y)+6x²(-y)²+4x(-y)³+(-y)^4
=x^4-4x³y+6x²y²-4xy³+y^4
e.
(x-2xy)^4=x^4+4x³(-2xy)+6x²(-2xy)²+4x(-2xy)³+(-2xy)^4
=x^4-8x^4y+24x^4y²-32x^4y³+16x^4y^4
=x^4(1-8y+24y²-32y3+16y^4)
Answer:
a) x⁴+4x³y+6x²y²+4xy³+y⁴
b) x⁴+8x³y+24x²y²+32xy³+16y⁴
c) 81x⁴
d) x⁴-4x³y+6x²y²-4xy³+y⁴
e) x⁴(1 - 8y + 24y²-32y³+16y⁴)
Step-by-step explanation:
The Binomial theorem describes the algebraic expression of powers of a binomial, it gives us a formula for a binomial of the kind (x ± y)ⁿ, the expansion of the binomial has terms of the form [tex]a^jb^k[/tex] where j + k = n, and the coefficients of each term are expressed in terms of combinations nCr (remember that nCr are the numbers of ways we can take r elements from a set of n elements where the order doesn't matter) where r ≤ n and r starts being 0 and it keeps growing until reaching n
The formula is
[tex](x+y)^n= nC0x^ny^0+nC1x^{n-1}y^1 +nC2x^{n-2}y^2+...+nC(n-1)x^1y^{n-1}+nCnx0y^n[/tex])
Now we're going to use this formula for the 4th power of the binomials.
The general formula in this case would be:
[tex](x+y)^4=4C0x^4y^0+$4C1x^3y^1 +4C2x^2y^2+4C3x^1y^3+4C4x^0y^4\\(x+y)^4=x^4+4x^3y+6x^2y^2+4xy^3+y^4[/tex]
So now we're going to apply the formula for:
a) (x+y)⁴
In this case we can see that this is the general formula as it was written before:
x⁴+4x³y+6x²y²+4xy³+y⁴
b) (x+2y)⁴
In this one we're going to use the formula but x = x and y = 2y
x⁴+4x³(2y)+6x²(2y)²+4x(2y)³+(2y)⁴
=x⁴+8x³y+6x²(4y²)+4x(8y³)+16y⁴
=x⁴+8x³y+24x²y²+32xy³+16y⁴
c)(x+2x)⁴
In this one we're going to use the first x as x and the y = 2x
x⁴+4x³(2x)+6x²(2x)²+4x(2x)³+(2x)⁴
=x⁴+8x⁴+24x⁴+32x⁴+16x⁴
=81x⁴
d) (x-y)⁴
This will be the same as (x + y)⁴but we're going to intercalate the "-" sign, so we get:
x⁴-4x³y+6x²y²-4xy³+y⁴
e) (x-2xy)⁴
For this one we have x = x and y = -2xy in the formula
x⁴-4x³(2xy) + 6x²(2xy)²-4x(2xy)³+(2xy)⁴
=x⁴-8x⁴y+24x⁴y²-32x⁴y³+16x⁴y⁴ we can factorize the x⁴ and we get:
x⁴(1 - 8y + 24y²-32y³+16y⁴)
