Question

How do you derive the spring constant when two springs are in series?

Answer 1

You add the reciprocals of the individual spring constants to get the reciprocal of the new combined spring constant.

Explanation:

The reciprocal of the new (effective) spring constant is found by adding the reciprocals of the constants for the two connected springs.

`1/k_(eff) = 1/k_1+1/k_2`

In this way, it is exactly like capacitors in series (which ought to be the case, as the role of a capacitor in a circuit is very similar to the role of a spring in a mechanical system).

So, if one spring had a constant of 6 N/m and the other was 3 n/m, the two in series would be

`1/k_(eff) = 1/6+1/3=1/2`

Such that `k_(eff) = 2N/m`.

Check this page for a derivation:

http://scienceworld.wolfram.com/physics/SpringsTwoSpringsinSeries.html

Answer 2

see below

Explanation:

Let the two springs have constants `k_1 , k_2`

and extensions `e_1,e_2`

for spring 1

`T_1=k_1e_1--(1)`

for spring 2

`T_2=k_2e_2--(2)`

the force on the springs is the same

so

`T_1=T_2`

`:.k_1e_1=k_2e_2`

`=>e_2=k_1/k_2e_1---(3)`

now overall

`T=k(e_1+e_2)`

where `k` is the spring constant overall

`:.T=k(e_1+k_1/k_2e_1)`

from `(3)`

`=>T=k((k_2+k_1)/k_2)e_1`

using `(1) in order to eliminate`e_1#

`k_1cancel(e_1)=k((k_2+k_1)/k_2)cancel(e_1)`

now rearrange

`k_1k_2=k(k_1+k_2)`

`=>k=(k_1k_2)/(k_1+k_2)`

`1/k=(k_1+k_2)/(k_1k_2)`

`1/k=1/k_1+1/k_2`