Three numbers form a geometric progression. If the second term is increased by 2, then the progression will become arithmetic and if, after this, the last term is increased by 9, then the progression will again become geometric. Find these three numbers.

The nth term of the geometric sequence is [tex]a_{n}=ar^{n-1}[/tex] , where a is the first term and r is the common ratio between the consecutive terms
The nth term of the arithmetic sequence is [tex]a_{n}=a+(n-1)d[/tex] , where a is the first term and d in the common difference between the consecutive terms

∵ Three numbers form a geometric progression

- Assume that the first number is a and the common ratio is r

and n = 1 , 2 , 3

∴ The three terms are a , ar and ar²

∵ The second term is increased by 2

∴ The three terms are a , ar + 2 , ar²

∵ The three terms formed an arithmetic progression

- The common difference between each two consecutive terms is d

∴ d = ar + 2 - a and d = ar² - (ar + 2)

- Equate the right hand sides of d

∴ ar + 2 - a = ar² - ar - 2

- Add 2 to both sides

∴ ar - a + 4 = ar² - ar

- Subtract ar from both sides

∴ -a + 4 = ar² - 2ar

- Add a to both sides

∴ 4 = ar² - 2ar + a

- Take a as a common factor in the right hand side

∴ 4 = a(r² - 2r + 1)

∵ r² - 2r + 1 = (r - 1)²

∴ 4 = a(r - 1)²

- Divide both sides by (r - 1)²

∴ [tex]a=\frac{4}{(r-1)^{2}}[/tex] ⇒ (1)

∵ The last term is increased by 9

∴ The three terms are a , ar + 2 , ar² + 9

∵ The three terms formed an geometric progression

- Find the common ratio between each two consecutive terms

∵ The common ratio = [tex]\frac{ar+2}{a}[/tex]

∵ The common ratio = [tex]\frac{ar^{2}+9}{ar+2}[/tex]

- Equate the right hand sides of the common ratio

∴ [tex]\frac{ar+2}{a}=\frac{ar^{2}+9}{ar+2}[/tex]

- By using cross multiplication

∴ a(ar² + 9) = (ar + 2)²

- Simplify the two sides

∴ a²r² + 9a = a²r² + 4ar + 4

- Subtract a²r² from both sides

∴ 9a = 4ar + 4

- Subtract 4ar from both sides

∴ 9a - 4ar = 4

- Take a as a common factor from both sides

∴ a(9 - 4r) = 4

- Divide both sides by (9 - 4r)

∴ [tex]a=\frac{4}{(9-4r)}[/tex] ⇒ (2)

Equate the right hand sides of (1) and (2)

∴ [tex]\frac{4}{(r-1)^{2}}[/tex] = [tex]\frac{4}{(9-4r)}[/tex]

- By using cross multiplication

∴ 4(r - 1)² = 4(9 - 4r)

- Divide both sides by 4

∴ (r - 1)² = 9 - 4r

- Solve the bracket of the left hand side

∴ r² - 2r + 1 = 9 - 4r

- Add 4r to both sides

∴ r² + 2r + 1 = 9

- Subtract 9 from both sides

∴ r² + 2r - 8 = 0

- Factorize it into 2 factors

∴ (r - 2)(r + 4) = 0

- Equate each factor by 0

∵ r - 2 = 0

- Add 2 to both sides

∴ r = 2

∵ r + 4 = 0

- Subtract 4 from both sides

∴ r = -4 ⇒ rejected

Substitute the value of r in equation (2) to find a

∵ [tex]a=\frac{4}{9-4(2)}=\frac{4}{9-8}=\frac{4}{1}[/tex]

∴ a = 4

∵ The three numbers are a , ar , ar²

∵ a = 4 and r = 2

∴ The numbers are 4 , 4(2) , 4(2)²

∴ The numbers are 4 , 8 , 16

Lets check the answer

4 , 8 + 2 , 16 ⇒ 4 , 10 , 16 formed an arithmetic progression with common difference 6

4 , 10 , 16 + 9 ⇒ 4 , 10 , 25 formed a geometric progression with common ratio 2.5

The three numbers are 4 , 8 , 16

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ahirohit963 ahirohit963 · Answer 2 · 2021-11-23T07:24:45+01:00

The three terms in geometric progression are 4, 8, and 16 and this can be determined by using the properties of geometric progression.

Given :

Three numbers form a geometric progression.
If the second term is increased by 2, then the progression will become arithmetic.
If, after this, the last term is increased by 9, then the progression will again become geometric.

Let the three terms in geometric progression be a, ar, and [tex]ar^2[/tex]. Given that if the second term is increased by 2 then the progression will become arithmetic that is:

[tex]\rm d =ar+2-a[/tex] and [tex]\rm d = ar^2 - (ar+2)[/tex]

Now, equate both the equation.

[tex]ar+2-a=ar^2-ar-2[/tex]

[tex]2ar+4=ar^2+a[/tex]

[tex]4 = a(r^2-2r+1)[/tex]

Factorize the above equation.

[tex]4= a(r-1)^2[/tex]

[tex]a = \dfrac{4}{(r-1)^2}[/tex] ---- (1)

Now, it is also given that the last term is increased by 9, that is:

a, ar + 2, a[tex]\rm r^2[/tex] + 9

The common ratio of the above geometric progression is:

[tex]\rm Common \; Ratio = \dfrac{ar+2}{a}[/tex] ---- (2)

[tex]\rm Common \; Ratio = \dfrac{ar^2+9}{ar+2}[/tex] ---- (3)

Now, equate both the equation.

[tex]\rm \dfrac{ar+2}{a}=\dfrac{ar^2+9}{ar+2}[/tex]

Cross multiply in the above equation.

[tex]\rm (ar+2)^2=a(ar^2+9)[/tex]

[tex]\rm a^2r^2+4+4ar=a^2r^2+9a[/tex]

9a - 4ar - 4 = 0

[tex]\rm a = \dfrac{4}{9-4r}[/tex] --- (4)

Now, equate equation (1) and equation (4).

[tex]\dfrac{4}{9-4r} = \dfrac{4}{(r-1)^2}[/tex]

Cross multiply in the above equation.

[tex]\rm r^2-2r+1 = 9-4r[/tex]

[tex]\rm r^2+2r-8=0[/tex]

Factorize the above equation.

[tex]\rm r^2 +4r - 2r -8=0[/tex]

(r + 4)(r - 2) = 0

r = 2 (Accepted)

Now, put the value of r in the equation (4).

[tex]a =\dfrac{4}{9-4(2)}[/tex]

a = 4

ar = 4(2) = 8

a[tex]r^2[/tex] = 4(4) = 16

The three terms in geometric progression are 4, 8, and 16.

For more information, refer to the link given below:

https://brainly.com/question/22687297