The formula for the Binomial Theorem with a power 6 is as:
[tex] (x+y)^6=x^6+6x^5y+15x^4y^2+20x^3y^3+15x^2y^4+6xy^5+y^6 [/tex]
Thus, if we plug in 20 for x and 5 for y, our first term itself will be [tex] 20^6=64000000 [/tex] which is much greater than 256 and thus it will not make any sense to use [tex] (20+5)^6 [/tex] to approximate 256 using the binomial theorem.
Also, it will not make any sense to use [tex] (20+5)6 [/tex] as that has no power and we know that Binomial Theorem makes use of Power. Anyway, [tex] (20+5)6=150\neq 256 [/tex].
Our best bet here would be to use the equation with power 8:
[tex] (x+y)^8=x^8+8x^7y+28x^6y^2+56x^5y^3+70x^4y^4+56x^3y^8+28x^2y^6+7xy^7+y^8 [/tex]
and have [tex] x=1 [/tex] and [tex] y=1 [/tex] which will give us
[tex] (1+1)^8=1^8+8(1)^7(1)+28(1)^6(1)^2+56(1)^5(1)^3+70(1)^4(1)^4+56(1)^3(1)^8+28(1)^2(1)^6+7(1)(1)^7+(1)^8 =256 [/tex]
Because 5 is not between -1 and 1, when it is raised to a positive integer exponent it will not approach 0. Therefore, all seven terms would need to be calculated and added to find (20 + 5)6
