Given:
s is inversely proportional to t.
When s = 0.5, t = 7.
To find:
The value of s when t=0.8.
Solution:
...(i)
Where, k is the constant of proportionality.
Putting s=0.5 and t=7, we get
Putting k=3.5 in (i), we get
This is the equation of proportionality.
Putting t=0.8, we get
Therefore, the value of s is 4.375 when t=0.8.
s = 10
Step-by-step explanation:
Given s is inversely proportional to t , then the equation relating them is
s = ← k is the constant of proportion
To find k use the condition when s = 0.6, t = 5
0.6 = ( multiply both sides by 5 )
3 = k
s = ← equation of proportion
When t = 0.3, then
s = = 10
s will be 14 when t= 0.3
Given that s is inversely proportional to t.
Inverse proportion is defined as the increase in one value causes decrease in other or decrease in one value causes increase in other
The give proportion can be expressed as:
s ∝ 1/t
Removing the proportionality symbol
Putting s = 0.7, t = 6
The equation will be:
Putting t= 0.3
Hence,
t=0.08
see attached kindly
t = 0.7
s = k/t where 'k' is the constant of variation
given: 0.5 = k/7 so k = 3.5
5 = 3.5/t
5t = 3.5
S = k/t
Putting values
0.8 = k/3
2.4 = k
Find s when t = 1.2
S = k/x
S = 2.4/1.2
S = 2
It will provide an instant answer!
6
Get Answer
...(i)
1
← k is the constant of proportion
( multiply both sides by 5 )
← equation of proportion
= 10
