Lesson Worksheet: General Term in the Binomial Theorem Mathematics

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In this worksheet, we will practice finding a specific term and the coefficient of a specific term inside a binomial expansion without the need to fully expand the series.

Q1:

Find the third term in the expansion of .

Q2:

Find in the expansion of .

Q3:

Determine the coefficient of in the expansion of .

Q4:

The terms of the expansion of are arranged according to the descending powers of . Given that , find the value of .

Q5:

If the coefficient of the third term in the expansion of is , determine the middle term in the expansion.

Q6:

Consider the expansion of . Find the ratio between the eighth and the seventh terms, when written in descending powers of .

Q7:

Consider the expansion of , where is positive. Find the values of , , and given that , , and .

A, ,
B, ,
C, ,
D, ,

Q8:

Consider the binomial expansion of in ascending powers of . When , one of the terms in the expansion is equal to twice its following term. Find the position of these two terms.

Q9:

Consider the expansion of , where is a positive constant. Determine the values of and , given that the ratio between the coefficients of and is equal to and that the ratio between the coefficients of and is equal to .

Q10:

Find the ratio between the fifteenth and seventeenth terms in the expansion of .

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