Answer : (i) AM = 25 and GM = 20 To find: Two positive numbers a and b Given: AM = 25 and GM = 20
Formula used: (i) Arithmetic mean between
(ii) Geometric mean between
Arithmetic mean of two numbers⇒ a + b = 50
⇒ b = 50 – a … (i)
Geometric mean of two numbers
Substituting value of b from eqn. (i) a(50 – a) = 400
⇒ 50a – a2 = 400
On rearranging
⇒ a2 – 50a + 400 = 0
⇒ a2 – 40a – 10a + 400
⇒ a(a – 40) – 10(a – 40) = 0
⇒ (a – 10) (a – 40) = 0
⇒ a = 10, 40
Substituting, a = 10 Or a = 40 in eqn. (i) b = 40 Or b = 10
Therefore two numbers are 10 and 40
(ii) AM = 10 and GM = 8
To find: Two positive numbers a and b Given: AM = 10 and GM = 8
Formula used: (i) Arithmetic mean between
(ii) Geometric mean between
Arithmetic mean of two numbers
⇒ a + b = 20
⇒ a = 20 – b … (i)
Geometric mean of two numbersSubstituting value of a from eqn. (i) b(20 – b) = 64
⇒ 20b – b2 = 64 On rearranging
⇒ b2 – 20b + 64 = 0
⇒ b2 – 16b – 4b + 64
⇒ b(b – 16) – 4(b – 16) = 0
⇒ (b – 16) (b – 4) = 0
⇒ b = 16, 4
Substituting, b = 16 Or b = 4 in eqn. (i) a = 4 Or b = 16
Therefore two numbers are 16 and 4