Answer:
the range of length scales is ( 0.0602 - 0.1094 )
Explanation:
Given the data in the question;
[tex]P_{absolute[/tex] = 1300 kPa
V[tex]_{prototype[/tex] = 406 km/h
speed of model nit more than 29%
we know that Reynolds number Re = pVl/μ = constant
p[tex]_m[/tex]V[tex]_m[/tex]l[tex]_m[/tex]/μ[tex]_m[/tex] = pVl/μ
such that;
l[tex]_m[/tex]/l = ( p/p[tex]_m[/tex] )( V/V[tex]_m[/tex] )( μ[tex]_m[/tex]/μ ) ----- let this be equation 1
Now, for an idea gas; P = pRT { with constant temperature }
p / p = constant; p/p[tex]_m[/tex] = p/p[tex]_m[/tex]
assuming μ[tex]_m[/tex] = μ[tex]_m[/tex]
Therefore, the relation becomes;
l[tex]_m[/tex]/l = ( p/p[tex]_m[/tex] )( V/V[tex]_m[/tex] )
from the given data;
l[tex]_m[/tex]/l = ( 101/1300 )( V/V[tex]_m[/tex] )
where our V[tex]_m[/tex] = ( 1 ± 29% )V
so
l[tex]_m[/tex]/l = ( 101/1300 )( V / ( 1 ± 29% )V )
l[tex]_m[/tex]/l = ( 101/1300 )( 1 / ( 1 ± 0.29 ) )
Now, The minimum limit will be;
l[tex]_m[/tex]/l = ( 101/1300 )( 1 / ( 1 + 0.29 ) )
= ( 101/1300 ) × ( 1 / 1.29 )
= 0.0602
The maximum limit will be;
l[tex]_m[/tex]/l = ( 101/1300 )( 1 / ( 1 - 0.29 ) )
= ( 101/1300 ) × ( 1 / 0.71 )
= 0.1094
Therefore, the range of length scales is ( 0.0602 - 0.1094 )
