Binomial Theroem (1 Viewer)

goobi · Jun 14, 2012

This is an easy question (as it's from Math in Focus) but I keep getting the answer wrong.
Could someone please read over my working out and tell me what I did wrong? Thanks

(a) Simplify $\frac{\binom{6}{k}}{\binom{6}{k-1}}$

Solution: $\frac{7-k}{k}$ (which is correct according to the answer in the back of the book)

(b) Hence or otherwise, find the greatest coefficient in the expansion of $(2+x)^6$ .

$T_{k}> T_{k-1}$

$\binom{6}{k}> \binom{6}{k-1}$

$\frac{\binom{6}{k}}{\binom{6}{k-1}}> 1$

$\frac{7-k}{k}> 1$

$7-k> k$

$7> 2k$

$3.5> k$

$k< 3.5$

Therefore, for k = 3,2,1, the coefficient of $T_{k}> T_{k-1}$

Hence, the term with the greatest coefficient occurs when k = 3

$T_{k+1}=\binom{6}{k}\cdot2^{6-k}\cdot x^k$

When k = 3,

$T_{3+1}=\binom{6}{3}\cdot2^{6-3}\cdot x^3$

$T_{4}=160x^3$

Therefore, greatest coefficient = 160

BUT the answer is actually 240.

Theorem*

Sy123 · Jun 14, 2012

There is nothing wrong with the answer because when you normally expand it, the largest coeffiecient is indeed 240, coming from the term

$\binom{6}{2} \cdot 2^4$

Now as you can see, the "k" here is actually 2.

So Im guessing it is something to do with the fact that you proved

$T_{k}>T_{k-1}$

However when you sub in 3, you sub it into

$T_{k+1}$

Therefore because you substituted it into here, you are given the fourth term, however we know that the 3rd term has the highest coefficient. Since Tk>Tk-1 for k=3.

Since if we do

$\frac{T_{k+1}}{T_{k}}>1$

We get a different form of $\frac{7-k}{k}$
However we will get the same answer at the end, if we substitute properly

EDIT: Yes indeed this is true as:

$\frac{\binom{6}{k+1}}{\binom{6}{k}}=\frac{6-k}{k+1}$

$\frac{6-k}{k+1}>1 \\ 6-k>k+1 \\ \\ k<2.5$

However we get 2 as the greatest coefficient, now when we substiute it into T_k+1 which we were supposed to do, because its from there that we got our k solution. When k=2 is subbed in you get T3 which has a coefficient of 240

Therefore what you did wrong was indeed, that when you got k=3, you subbed it into the wrong term of T, you were supposed to sub it into T_k but subbed it into T_k+1
Since it was from T_k that you got the solution of k=3

goobi · Jun 14, 2012

Sy123 said:
There is nothing wrong with the answer because when you normally expand it, the largest coeffiecient is indeed 240, coming from the term

$\binom{6}{2} \cdot 2^4$

Now as you can see, the "k" here is actually 2.

So Im guessing it is something to do with the fact that you proved

$T_{k}>T_{k-1}$

However when you sub in 3, you sub it into

$T_{k+1}$

Therefore because you substituted it into here, you are given the fourth term, however we know that the 3rd term has the highest coefficient. Since Tk>Tk-1 for k=3.

Since if we do

$\frac{T_{k+1}}{T_{k}}>1$

We get a different form of $\frac{7-k}{k}$
However we will get the same answer at the end, if we substitute properly

EDIT: Yes indeed this is true as:

$\frac{\binom{6}{k+1}}{\binom{6}{k}}=\frac{6-k}{k+1}$

$\frac{6-k}{k+1}>1 \\ 6-k>k+1 \\ \\ k<2.5$

However we get 2 as the greatest coefficient, now when we substiute it into T_k+1 which we were supposed to do, because its from there that we got our k solution. When k=2 is subbed in you get T3 which has a coefficient of 240

Therefore what you did wrong was indeed, that when you got k=3, you subbed it into the wrong term of T, you were supposed to sub it into T_k but subbed it into T_k+1
Since it was from T_k that you got the solution of k=3

Repped

goobi · Jun 15, 2012

^I used this supposedly correct method to solve another question in the same excercise, but I got it wrong Can anyone please read over my working out and correct me if I'm wrong? Thanks
(a) Simplify $\frac{\binom{8}{k}}{\binom{8}{k-1}}$

Ans: $\frac{9-k}{k}$

(b) Hence, find the greatest coefficient of the expansion of $(1+x)^8$

Solution:

$T_{k}>T_{k-1}$

$\frac{9-k}{k}>1$

$9-k>k$

$9>2k$

$k<4.5$

$k=4$

Sy123 said:
Therefore what you did wrong was indeed, that when you got k=3, you subbed it into the wrong term of T, you were supposed to sub it into T_k but subbed it into T_k+1
Since it was from T_k that you got the solution of k=3

^Okay so according to what Sy123 suggested, I should now sub k=4 into T_k:
$T_{4}=\binom{8}{3}\cdot1^{8-3}\cdot x^3$
$T_{4}=56$

But the answer is supposed to be 70...

Carrotsticks · Jun 15, 2012

You subbed in k=4, so how did you manage to get 8C3?

funnytomato · Jun 15, 2012

goobi said:
^I used this supposedly correct method to solve another question in the same excercise, but I got it wrong Can anyone please read over my working out and correct me if I'm wrong? Thanks
(a) Simplify $\frac{\binom{8}{k}}{\binom{8}{k-1}}$

Ans: $\frac{9-k}{k}$

(b) Hence, find the greatest coefficient of the expansion of $(1+x)^8$

Solution:

$T_{k}>T_{k-1}$

$\frac{9-k}{k}>1$

$9-k>k$

$9>2k$

$k<4.5$

$k=4$

^Okay so according to what Sy123 suggested, I should now sub k=4 into T_k:
$T_{4}=\binom{8}{3}\cdot1^{8-3}\cdot x^3$
$T_{4}=56$

But the answer is supposed to be 70...

NOTE :

(1+x)^8= 8C0 + 8C1 x + 8C2 x^2 +...+ 8C8 x^8
and counting from 1, we have T1, T2, T3, ..., T9 respectively

So Tk=8 choose k-1 (*)
Tk+1 = 8 choose k

the inequality you solved is acutally for Tk+1 > Tk , from which we obtain k<4.5
hence T5>T4>T3>T2>T1
inequality doesn't hold for larger k values, so T6, T7, T8,T9 are not greater than T5

therefore
T5=8C4=70 [c.f. (*) if you're not sure about this]

Binomial Theroem (1 Viewer)

goobi

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Sy123

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goobi

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goobi

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Carrotsticks

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