Respuesta :
Answer:
Number of boys were [tex]10.[/tex]
Step-by-step explanation:
According to Direct proportion:
When [tex]x[/tex] varies directly with [tex]y[/tex] then [tex]x=ky[/tex], {where [tex]k[/tex] is proportionality
constant}.
Let number of girl be [tex]g[/tex],
Number of boy be [tex]b[/tex],
And number of teacher be [tex]t[/tex].
From the question,
Number of girls varies directly as the number of boys and inversely with number of teacher.
So, Using direct proportion we get an equation
[tex]g=\frac{k\times b}{t}[/tex] ........(a)
Case 1: [tex]g=50[/tex] , [tex]t=20[/tex] , and [tex]b=10[/tex]
Now, substituting all the values in equation (a) we get,
[tex]50=\frac{k\times 10}{20}[/tex] ⇒ [tex]k\times 10=50\times20[/tex]
[tex]k=100[/tex]
Case 2: [tex]g=10[/tex] , [tex]t=100[/tex] , [tex]b=?[/tex]
Finding the number of boys using [tex]k=100[/tex] we get,
[tex]10=\frac{100\times b}{100}[/tex] ⇒ [tex]b=10[/tex]
Therefore, Number of boys were [tex]10.[/tex]
