Solve the question attached
Class 11th
Maths
Harmonic Progression
Right answer will get brainiest
Wrong will straight away reported
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Solve the question attached
Class 11th
Maths
Harmonic Progression
Right answer will get brainiest
Wrong will straight away reported
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Verified answer
Question :
If are in HP
prove that
Theory :
If a,b,c are in HP then
are in AP
Solution :
are in HP
Therefore
are in AP
Let the common difference of AP be d
Similarly,
and
we know that ,
Genral term of an ap=
Therefore,nth term of the AP series .
___________________________
We have to prove that
LHS=
Now put the value of d from (1),then we get
=RHS
⇒LHS =RHS
Hence proved
Solve: (2x + 5)/(x + 4) = 1
Solution:
(2x + 5)/(x + 4) = 1
⇒ 2x + 5 = 1(x + 4)
⇒ 2x + 5 = x + 4
⇒ 2x - x = 4 - 5 (Transferring positive x to the left hand side changes to negative x and again, positive 5 changes to negative 5)
⇒ x = -1
Therefore, x = - 1 is the required solution of the equation (2x + 5)/(x + 4) = 1
Solution:
6x - 19 = 3x - 10
⇒ 6x - 3x = - 10 + 19 (Transferring 3x to L.H.S changes to negative 3x and -19 to R.H.S. changes to positive 19)
⇒ 3x = 9
⇒ 3x/3 = 9/3 (Dividing both sides by 3)
⇒ x = 3
3. Solve: 5 - 2(x - 1) = 4(3 - x) - 2x.
Solution:
5 - 2(x - 1) = 4(3 - x) - 2x
⇒ 5 - 2x + 2 = 12 - 4x - 2x (Removing the brackets and then simplify)
⇒ 7 - 2x = 12 - 6x (Transferring -6x to L.H.S. changes to positive 6x and 7 to R.H.S. changes to negative 7)
⇒ -2x + 6x = 12 - 7
⇒ 4x = 5
⇒ 4x/4 = 5/4
⇒ x = 5/4
4. x/2 + x/3 = x - 7
Solution:
x/2 + x/3 = x - 7
Least common multiple of2 and 3 is 6
⇒ (x/2 × 3/3) + (x/3 × 2/2) = x - 7
⇒ 3x/6 + 2x/6 = x - 7
⇒ (3x + 2x)/6 = x - 7
⇒ 5x/6 = x - 7
⇒ 5x = 6(x - 7)
⇒ 5x = 6x - 42 (Transferring 6x to L.H.S. changes to negative 6x)
⇒ 5x - 6x = -42
⇒ -x = -42
⇒ x = 42
5. 2/(x + 3) = 3/(5 - x)
Solution:
2/(x + 3) = 3/(5 - x)
⇒ 3(x + 3) = 2(5 - x) (cross multiply and then remove the brackets)
⇒ 3x + 9 = 10 - 2x (Transferring -2x to L.H.S. changes to positive 2x and 9 to R.H.S. changes to -9)
⇒ 3x + 2x = 10 - 9
⇒ 5x = 1
⇒ 5x/5 = 1/5 (Dividing both sides by 5)
⇒ x = 1/5