If the coefficients of three consecutive terms in the expansion of are in the ratio , then the coefficient of the fourth term is:
- A
- B
- C
- D
If the coefficients of three consecutive terms in the expansion of are in the ratio , then the coefficient of the fourth term is:
Correct answer:B
Standard Method
Given: The coefficients of three consecutive terms in the expansion of are in the ratio .
Find: The coefficient of the fourth term.
Let the three consecutive coefficients be
Then,
From
we get
So,
Also,
Hence,
So,
Equating the two values of ,
Therefore,
The fourth term in the expansion of has coefficient
So,
Therefore, the coefficient of the fourth term is . The correct option is B.
Using ratios of consecutive binomial coefficients
Given: Three consecutive binomial coefficients are in the ratio .
Find: The coefficient of the fourth term of .
For consecutive coefficients,
Since the ratio is , the first adjacent ratio is and the second adjacent ratio is .
Thus,
From the first equation,
From the second equation,
Comparing,
Hence,
Now the fourth term of is
Therefore its coefficient is
Therefore, the required coefficient is .
Taking the ratio directly as two equations and without using the middle term carefully can make the algebra longer. Use adjacent ratios first: and .
Confusing the coefficient of the fourth term with is incorrect. In the expansion of , the fourth term is , so the coefficient is .
Using the wrong formula for consecutive binomial coefficients is a common conceptual error. The correct identities are and .
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