Three numbers, of which the third is equal to $36$ , form a geometric progression. If $36$ is replaced with $20$ , then the three numbers form an arithmetic progression. Find these three numbers.

Open in App

Solution

Step-1: Forming relation in three numbers:
Let $x, y,$ and $z$ be the three numbers.
Since the third number of the geometric progression is equal to $36$ .
Using the geometric mean concept and it can be written as :
$\begin{array}{rcl} y^{2} & = & x z \\ \Rightarrow & y^{2} = x (36) [Substitute z = 36] \\ ∴ y^{2} & = & 36 x . . . (3) \end{array}$
If $36$ is replaced with $20$ , then the three numbers form an arithmetic progression.
Using the arithmetic mean concept and it can be written as :
$\begin{array}{rcl} y & = & \frac{x + z}{2} \\ ∴ y & = & \frac{x + 20}{2} . . . (4) [Substitute z = 20] \end{array}$
Step-2: Solving quadratic equation:
Substitute the value of $y$ from equation $(4)$ in the equation $(3)$ and solve for $x$ :
$\begin{array}{rcl} {(\frac{x + 20}{2})}^{2} & = & 36 x [Simplifying] \\ \Rightarrow & \frac{x^{2} + 400 + 40 x}{4} = 36 x \\ \Rightarrow & x^{2} + 400 + 40 x = 144 x \\ \Rightarrow & x^{2} - 104 x + 400 = 0 \\ \Rightarrow & x^{2} - 100 x - 4 x + 400 = 0 \\ \Rightarrow & x (x - 100) - 4 (x - 100) = 0 \\ \Rightarrow & (x - 4) (x - 100) = 0 \\ ∴ x & = & 4 or 100 \end{array}$
Step-3: Find the numbers:
Substitutes the value of $x$ in equation $(4)$ and calculates the value of $y$ :
$\begin{array}{rcl} y & = & \frac{4 + 20}{2} or \frac{100 + 20}{2} [Simplifying] \\ \Rightarrow & y = \frac{24}{2} or \frac{120}{2} \\ ∴ y & = & 12 or 60 \end{array}$
Therefore, the three numbers are either $4, 12, 36 or 100, 60, 20$ .
Hence, three numbers are either $4, 12, 36 or 100, 60, 20$ .

Suggest Corrections

Similar questions

8

26

28

3

1

5

400

64

\frac{14}{3}

Join BYJU'S Learning Program