Is My Attempt at Solving the Binomial Expansion Homework Correct?

In summary, determining the correctness of one's attempt at solving binomial expansion homework involves checking for the correct application of the binomial theorem and the coefficient formula, as well as ensuring proper simplification and expansion of the terms. It is also important to double check for any errors or incorrect assumptions made during the process. Overall, a thorough understanding of the concept and careful attention to detail is necessary for a correct solution.
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  • #3
bllnsr said:
here's my attempt to part (i)
http://i47.tinypic.com/2yv6y3s.png
is it correct?
You got the correct answer somehow, but your working is flawed. Can you see where?
 
  • #4
oay said:
You got the correct answer somehow, but your working is flawed. Can you see where?

Ooops. Yeah, I agree. I somehow just read through the bad part. -1/0 should have been a tip off.
 
  • #5
oh yes -1/0 is -∞ but I made it zero:frown:
a/3 +1 = -1/2x
putting x = 0
a/3 +1 = -1/2(0)
a/3 +1 = -1/0
-1/0 is -∞
a/3 +1 = -∞
if a = -3 is the correct answer how to get this value :confused:
 
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  • #6
The question states "the coefficient of the term in x is zero".

What do you think this coefficient is?
 
  • #7
somebody told me this general formula
[itex]T_{r+1} = \binom{n}{r}a^n b^r[/itex]
will be used to find 'a' and the statement "the coefficient of the term in x is zero" means
that [itex]\binom{n}{r}[/itex] is 0 and what I did previously is wrong.
I have math exam tomorrow and this is the only question that I cannot solve
 
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  • #8
bllnsr said:
somebody told me this general formula
[itex]T_{r+1} = \binom{n}{r}a^n b^r[/itex]
will be used to find 'a' and the statement "the coefficient of the term in x is zero" means
that [itex]\binom{n}{r}[/itex] is 0 and what I did previously is wrong.
I have math exam tomorrow and this is the only question that I cannot solve

What you did before is almost right. When you get to 1+(2ax/3)+2x=1+(2a/3+2)x the part you want to make 0 is just the coefficient of x, (2a/3+2). Ignore the 1, it doesn't have anything to do with x.
 
  • #9
@Dick
can you please show me last two steps of how to solve it for a
 
  • #10
bllnsr said:
@Dick
can you please show me last two steps of how to solve it for a

Ok, just for you. 2a/3+2=0, 2a/3=(-2) (subtract 2 from both sides), 2a=(-2)*3 (multiply both sides by 3), a=(-2)*3/2=(-3) (divide both sides by 2).
 
  • #11
Thanks
 
  • #12
bllnsr said:
Thanks

You're welcome. Notice no 1/0 appears. If it does that's a pretty sure sign something is wrong.
 

FAQ: Is My Attempt at Solving the Binomial Expansion Homework Correct?

What is the binomial expansion question?

The binomial expansion question is a mathematical problem that involves expanding a binomial expression raised to a certain power. It is used to determine the coefficients and terms in the expansion of a binomial expression.

What is the formula for binomial expansion?

The formula for binomial expansion is (a + b)^n = nC0 * a^n + nC1 * a^(n-1) * b + nC2 * a^(n-2) * b^2 + ... + nC(n-1) * a * b^(n-1) + nCn * b^n, where n is the power, a and b are the two terms in the binomial expression, and nCr represents the combination formula nCr = n! / (r! * (n-r)!).

How do you solve a binomial expansion question?

To solve a binomial expansion question, you can follow these steps:1. Write out the expansion formula using the given binomial expression and power.2. Use the combination formula to determine the coefficients (nCr).3. Substitute the values of n, r, a, and b into the formula and calculate each term.4. Simplify the terms by combining like terms.5. Write the final answer in expanded form.

What is the purpose of binomial expansion?

The purpose of binomial expansion is to determine the coefficients and terms in the expansion of a binomial expression. It is also used in various mathematical applications such as probability, statistics, and calculus.

What are some real-life applications of binomial expansion?

Binomial expansion has many real-life applications, such as predicting outcomes in probability and statistics, calculating compound interest in finance, and determining the coefficients in the expansion of functions in calculus. It is also used in fields such as genetics, engineering, and physics.

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