if 460cm³ of sulphur(iv) oxide, can diffuse through porous partotion in 30seconds, how long will (a) an equal volume
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To determine the time it takes for an equal volume to diffuse through a porous partition, we can use the concept of diffusion rates.
The diffusion rate is determined by the volume of substance that can diffuse over a certain period of time. In this case, we know that 460 cm³ of sulfur (IV) oxide diffuses through in 30 seconds. Let's call this diffusion rate "R".
To find the time it takes for an equal volume, we need to calculate the diffusion time using the diffusion rate.
Let's assume that the equal volume is also 460 cm³. Using the diffusion rate, we can set up the following equation:
Rate = Volume / Time
R = 460 cm³ / 30 s
Now, to determine the time required for an equal volume, we rearrange the equation to solve for Time:
Time = Volume / Rate
Time = 460 cm³ / R
Substituting the value of R, we get:
Time = 460 cm³ / (460 cm³ / 30 s)
Simplifying the equation, we can cancel out the cm³ units:
Time = 1 s
Therefore, it will take 1 second for an equal volume of 460 cm³ of sulfur (IV) oxide to diffuse through the porous partition.