$ \Rightarrow f'(x) = \frac{{\left( {1 + {x^{\frac{3}{5}}}} \right)\frac{3}{5}{{(1 + x)}^{ - \frac{2}{5}}} - \frac{3}{5}{{(1 + x)}^{\frac{3}{5}}}\left( {{x^{\frac{{ - 2}}{5}}}} \right)}}{{{{\left( {1 + {x^{\frac{3}{5}}}} \right)}^2}}}$
$ = \frac{3}{5}\left. {\left[ {\left( {1 + {x^{\frac{3}{5}}}} \right){{\left( {1 + x} \right)}^{ - \frac{2}{5}}}} \right. - {{\left( {1 + x} \right)}^{\frac{3}{5}}}{x^{\frac{{ - 2}}{5}}}} \right]$
$ = \frac{3}{5}\left[ {\frac{{1 + {x^{\frac{3}{5}}}}}{{{{\left( {1 + x} \right)}^{\frac{2}{5}}}}} - \frac{{{{(1 + x)}^{\frac{3}{5}}}}}{{{x^{\frac{2}{5}}}}}} \right]$
$ = \frac{{{x^{\frac{2}{5}}} + x - x}}{{{x^{\frac{2}{5}}}{{\left( {1 + x} \right)}^{\frac{2}{5}}}}} = \frac{{{x^{\frac{2}{5}}} - 1}}{{{x^{\frac{2}{5}}}{{\left( {1 + x} \right)}^{\frac{2}{5}}}}} < 0$
Alos, $f(0) = 1$
$ \Rightarrow f\left( x \right) \in \left[ {{2^{ - 04}},1} \right]$
$f(1) = {2^{ - 0,4}}$
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$f_1(x)=\int_0^x \prod_{j=1}^{21}( t - j )^{ j } dt , x >0$
and
$f_2(x)=98(x-1)^{50}-600(x-1)^{39}+2450, x>0,$
where, for any positive integer $n$ and real numbers $a _1, a _2, \ldots, a _{ n }, \prod_{i=1}^{ n } a _i$ denotes the product of $a _1, a _2, \ldots, a _{ n }$. Let $m _i$ and $n _i$, respectively, denote the number of points of local minima and the number of points of local maxima of function $f_i, i=1,2$, in the interval $(0, \infty)$
($2$) The value of $2 m_1+3 n_1+m_1 n_1$ is. . . . . .
($2$) The value of $6 m _2+4 n _2+8 m _2 n _2$ is. . . . . .
Give the answer or quetion ($1$) and ($2$)