\displaystyle{n} Explanation: First, we can simplify the numerator using the rule for exponents which states: \displaystyle{\left({x}^{{{a}}}\right)}\times{\left({x}^{{{b}}}\right)}={x}^{{{\left({a}\right)}+{\left({b}\right)}}} ...

\displaystyle{f}^{{\frac{{13}}{{10}}}} Explanation: \displaystyle{f}^{{\frac{{3}}{{2}}}}\times{f}^{{-\frac{{1}}{{5}}}} \displaystyle{f}^{{{\left(\frac{{3}}{{2}}\right)}+{\left(-\frac{{1}}{{5}}\right)}}} ...

\displaystyle\frac{{3}}{{64}} Explanation: \displaystyle{\left(\frac{{4}}{{8}}\right)}^{{2}}\times\frac{{3}}{{16}}={\left(\frac{{1}}{{2}}\right)}^{{2}}\times\frac{{3}}{{16}}=\frac{{1}}{{2}^{{2}}}\times\frac{{3}}{{16}}=\frac{{1}}{{4}}\times\frac{{3}}{{16}}=\frac{{3}}{{64}}

I will assume that we are in the context of the "classical" algebraic theory of quadratic forms, i.e., that the characteristic of F is not 2. 1) Suppose W(F) is finite. a) Let I be the ...

If F is finite, yes. The multiplicative group of a finite field of order q is cyclic of order q-1, so if [E:F]=r, F^\times is embedded in E^\times as the subgroup of (q^r-1)/(q-1)th ...

For F = \mathbb Q_2 we have \mathbb Q_2^\times / (\mathbb Q_2^\times)^2 \cong (\mathbb Z / 2\mathbb Z)^3, so the cardinality is 8, not 2. A 2-adic number x =\mathbb Q_2^\times can be written as ...