To prove: The given binomial theorem for n = 1 .

Question

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Answer 1

Question

Chapter 11.5, Problem 85E

(a)

To determine

To prove: The given binomial theorem for n=1.

(b)

To determine

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

(c)

To determine

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

(d)

To determine

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

(e)

To determine

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

(f)

To determine

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

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Answer 2

Question

Chapter 11.5, Problem 85E

(a)

To determine

To prove: The given binomial theorem for n=1.

(b)

To determine

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

(c)

To determine

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

(d)

To determine

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

(e)

To determine

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

(f)

To determine

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

Expert Solution & Answer

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Answer 3

Question

Chapter 11.5, Problem 85E

(a)

To determine

To prove: The given binomial theorem for n=1.

(b)

To determine

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

(c)

To determine

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

(d)

To determine

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

(e)

To determine

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

(f)

To determine

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

Expert Solution & Answer

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Answer 4

Question

Chapter 11.5, Problem 85E

(a)

To determine

To prove: The given binomial theorem for n=1.

(b)

To determine

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

(c)

To determine

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

(d)

To determine

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

(e)

To determine

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

(f)

To determine

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

Expert Solution & Answer

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Answer 5

Chapter 11.5, Problem 85E

(a)

To determine

To prove: The given binomial theorem for n=1.

(b)

To determine

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

(c)

To determine

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

(d)

To determine

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

(e)

To determine

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

(f)

To determine

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

Answer 6

Chapter 11.5, Problem 85E

(a)

To determine

To prove: The given binomial theorem for n=1.

Answer 7

Chapter 11.5, Problem 85E

(a)

To determine

To prove: The given binomial theorem for n=1.

Answer 8

(b)

To determine

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

Answer 9

(b)

To determine

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

Answer 10

(c)

To determine

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

Answer 11

(c)

To determine

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

Answer 12

(d)

To determine

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

Answer 13

(d)

To determine

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

Answer 14

(e)

To determine

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

Answer 15

(e)

To determine

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

Answer 16

(f)

To determine

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

Answer 17

(f)

To determine

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

Answer 18

Expert Solution & Answer

Answer 19

Expert Solution & Answer

Answer 20

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Answer 21

Ch. 11.1 - Fill in each blank so that the resulting statement...Ch. 11.1 - Fill in each blank so that the resulting statement...Ch. 11.1 - Fill in each blank so that the resulting statement...Ch. 11.1 - Fill in each blank so that the resulting statement...Ch. 11.1 - Prob. 5CVC Ch. 11.1 - Fill in each blank so that the resulting statement...Ch. 11.1 - Fill in each blank so that the resulting statement...Ch. 11.1 - Prob. 8CVC Ch. 11.1 - Prob. 1E Ch. 11.1 - Prob. 2E

To prove: The given binomial theorem for n = 1 .

Solution Summary: The author explains the given binomial theorem for n=1.

Videos

To prove: The given binomial theorem for n=1.

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

Want to see the full answer?

Chapter 11 Solutions

To prove: The given binomial theorem for n = 1 .

Solution Summary: The author explains the given binomial theorem for n=1.

Videos

To prove: The given binomial theorem for n=1.

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is (a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn Replace n=k and n=k+1.

To calculate: The statement for n=k that is assumed true to which (a+b) is multiplied and simplify.

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has (a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84. It is provided that (a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1

The resultant statement that must be proved. The statement can be obtained by substituting the results of (k0)=(k+10)(why?) and (kk)=(k+1k+1) and the results of part e in to the equation of part d.

Want to see the full answer?

Chapter 11 Solutions

The statement for which one can assumed have statement is true and the statement which has to be proven. If the binomial expression is

(a+b)n=(n0)an+(n1)an−1b+(n2)an−2b2+⋯+(nn−1)abn−1+(nn)bn

Replace n=k and n=k+1.

To calculate: Collecting like terms on the right-hand side of the last statement, at what time one has

(a+b)k+1=(k0)ak+1+(k0)akb+(k1)akb+(k1)ak−1b2+(k2)ak−1b2+(k2)ak−2b3+⋯+(kk−1)a2bk−1+(kk−1)abk+(kk)abk+(kk)bk+1

To calculate: The addition of binomial sums in brackets as per the results of Exercise 84.

It is provided that

(a+b)k+1=(k0)ak+1+[(k0)+(k1)]akb+[(k1)+(k2)]ak−1b2+[(k2)+(k3)]ak−2b3+⋯+[(kk−1)+(kk)]abk+(kk)bk+1