At what temperature is the root mean square speed of an atom in an argon gas cylinder equal to the r.m.s. speed of a helium gas atom at `-20^(@) C` ? (Atomic mass of Ar = 39.9 u, of He = 4.0 u).

At what temperature is the root mean square speed of an atom in an arg

1.	At what temperature is the root mean square speed of an atom in an argon gas cylinder equal to the r.m.s. speed of a helium gas atom at `-20^(@) C` ? (Atomic mass of Ar = 39.9 u, of He = 4.0 u).
Answer» Temperature of the helium atom, `T_He=-20^(@) C=253 K` Atomic mass of argon,` M_(Ar) = 39.9 u` Atomic mass of helium, `M_(He) = 4.0 u` Let, `(v_(rms))`.Ar be the rms speed of argon. Let `(v_(rms))`He be the rms speed of helium. The rms speed of argon is given by: `(v_(rms))_(Ar)=sqrt((3RT_Ar)/(M_(Ar))` Where, R is the universal gas constant `T_(Ar)` is temperature of argon gas The rms speed of helium is given by: `v_(rms)_He=sqrt((3RT_(He))/(M_(He))` It is given that: `=sqrt((3RT_(Ar))/(M_(Ar)))=sqrt((3RT_(He))/(M_(He)))` ` (T_(Ar))/(M_Ar)=(T_(He))/(M_He)` `T_(Ar)=(T_(He))/(M_(He))xxM_(Ar)` `=253/4xx39.9` ` = 2523.675 = 2.52 xx 10^3 K ` Therefore, the temperature of the argon atom is `2.52 xx 10^3 K`.

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At what temperature is the root mean square speed of an atom in an argon gas cylinder equal to the r.m.s. speed of a helium gas atom at `-20^(@) C` ? (Atomic mass of Ar = 39.9 u, of He = 4.0 u).

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