Example

3(r+2s)=2t-4
a⋅(b-2)=3b
3(r+2s)=2t-4
a⋅(b-2)=3b

Question

$$\left. \begin{array} { l } { A = \sqrt { \frac { 2 ^ { 12 } + 4 ^ { 3 } } { 2 ^ { 10 } + 4 ^ { 2 } } } ; B = } \end{array} \right.$$

Answer

$$p=-(2*B)/(Si*e*mA*IM*m^3*l*f*r*a^2*u^2*x)$$

Solution


Simplify  \({2}^{12}\)  to  \(4096\).
\[Simpl\imath f\imath eraumax\imath mumA=\sqrt{\frac{4096+{4}^{3}}{{2}^{10}+{4}^{2}}}B\]
Simplify  \({4}^{3}\)  to  \(64\).
\[Simpl\imath f\imath eraumax\imath mumA=\sqrt{\frac{4096+64}{{2}^{10}+{4}^{2}}}B\]
Simplify  \(4096+64\)  to  \(4160\).
\[Simpl\imath f\imath eraumax\imath mumA=\sqrt{\frac{4160}{{2}^{10}+{4}^{2}}}B\]
Simplify  \({2}^{10}\)  to  \(1024\).
\[Simpl\imath f\imath eraumax\imath mumA=\sqrt{\frac{4160}{1024+{4}^{2}}}B\]
Simplify  \({4}^{2}\)  to  \(16\).
\[Simpl\imath f\imath eraumax\imath mumA=\sqrt{\frac{4160}{1024+16}}B\]
Simplify  \(1024+16\)  to  \(1040\).
\[Simpl\imath f\imath eraumax\imath mumA=\sqrt{\frac{4160}{1040}}B\]
Simplify  \(\frac{4160}{1040}\)  to  \(4\).
\[Simpl\imath f\imath eraumax\imath mumA=\sqrt{4}B\]
Since \(2\times 2=4\), the square root of \(4\) is \(2\).
\[Simpl\imath f\imath eraumax\imath mumA=2B\]
Regroup terms.
\[mmmplfraauuxSi\imath \imath e\imath mA=2B\]
Simplify  \(mmmplfraauuxSi\imath \imath e\imath mA\)  to  \({m}^{3}plfr{a}^{2}{u}^{2}xSi\imath \imath e\imath mA\).
\[{m}^{3}plfr{a}^{2}{u}^{2}xSi\imath \imath e\imath mA=2B\]
Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[{m}^{3}plfr{a}^{2}{u}^{2}xSi{\imath }^{3}emA=2B\]
Isolate \({\imath }^{2}\).
\[{m}^{3}plfr{a}^{2}{u}^{2}xSi{\imath }^{2}\imath emA=2B\]
Use Square Rule: \({i}^{2}=-1\).
\[{m}^{3}plfr{a}^{2}{u}^{2}xSi\times -1\times \imath emA=2B\]
Simplify  \({m}^{3}plfr{a}^{2}{u}^{2}xSi\times -1\times \imath emA\)  to  \({m}^{3}plfr{a}^{2}{u}^{2}xSi\times -\imath emA\).
\[{m}^{3}plfr{a}^{2}{u}^{2}xSi\times -\imath emA=2B\]
Regroup terms.
\[-SiemA\imath {m}^{3}plfr{a}^{2}{u}^{2}x=2B\]
Divide both sides by \(-Si\).
\[emA\imath {m}^{3}plfr{a}^{2}{u}^{2}x=-\frac{2B}{Si}\]
Divide both sides by \(e\).
\[mA\imath {m}^{3}plfr{a}^{2}{u}^{2}x=-\frac{\frac{2B}{Si}}{e}\]
Simplify  \(\frac{\frac{2B}{Si}}{e}\)  to  \(\frac{2B}{Sie}\).
\[mA\imath {m}^{3}plfr{a}^{2}{u}^{2}x=-\frac{2B}{Sie}\]
Divide both sides by \(mA\).
\[\imath {m}^{3}plfr{a}^{2}{u}^{2}x=-\frac{\frac{2B}{Sie}}{mA}\]
Simplify  \(\frac{\frac{2B}{Sie}}{mA}\)  to  \(\frac{2B}{SiemA}\).
\[\imath {m}^{3}plfr{a}^{2}{u}^{2}x=-\frac{2B}{SiemA}\]
Divide both sides by \(\imath \).
\[{m}^{3}plfr{a}^{2}{u}^{2}x=-\frac{\frac{2B}{SiemA}}{\imath }\]
Simplify  \(\frac{\frac{2B}{SiemA}}{\imath }\)  to  \(\frac{2B}{SiemA\imath }\).
\[{m}^{3}plfr{a}^{2}{u}^{2}x=-\frac{2B}{SiemA\imath }\]
Divide both sides by \({m}^{3}\).
\[plfr{a}^{2}{u}^{2}x=-\frac{\frac{2B}{SiemA\imath }}{{m}^{3}}\]
Simplify  \(\frac{\frac{2B}{SiemA\imath }}{{m}^{3}}\)  to  \(\frac{2B}{SiemA\imath {m}^{3}}\).
\[plfr{a}^{2}{u}^{2}x=-\frac{2B}{SiemA\imath {m}^{3}}\]
Divide both sides by \(l\).
\[pfr{a}^{2}{u}^{2}x=-\frac{\frac{2B}{SiemA\imath {m}^{3}}}{l}\]
Simplify  \(\frac{\frac{2B}{SiemA\imath {m}^{3}}}{l}\)  to  \(\frac{2B}{SiemA\imath {m}^{3}l}\).
\[pfr{a}^{2}{u}^{2}x=-\frac{2B}{SiemA\imath {m}^{3}l}\]
Divide both sides by \(f\).
\[pr{a}^{2}{u}^{2}x=-\frac{\frac{2B}{SiemA\imath {m}^{3}l}}{f}\]
Simplify  \(\frac{\frac{2B}{SiemA\imath {m}^{3}l}}{f}\)  to  \(\frac{2B}{SiemA\imath {m}^{3}lf}\).
\[pr{a}^{2}{u}^{2}x=-\frac{2B}{SiemA\imath {m}^{3}lf}\]
Divide both sides by \(r\).
\[p{a}^{2}{u}^{2}x=-\frac{\frac{2B}{SiemA\imath {m}^{3}lf}}{r}\]
Simplify  \(\frac{\frac{2B}{SiemA\imath {m}^{3}lf}}{r}\)  to  \(\frac{2B}{SiemA\imath {m}^{3}lfr}\).
\[p{a}^{2}{u}^{2}x=-\frac{2B}{SiemA\imath {m}^{3}lfr}\]
Divide both sides by \({a}^{2}\).
\[p{u}^{2}x=-\frac{\frac{2B}{SiemA\imath {m}^{3}lfr}}{{a}^{2}}\]
Simplify  \(\frac{\frac{2B}{SiemA\imath {m}^{3}lfr}}{{a}^{2}}\)  to  \(\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}}\).
\[p{u}^{2}x=-\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}}\]
Divide both sides by \({u}^{2}\).
\[px=-\frac{\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}}}{{u}^{2}}\]
Simplify  \(\frac{\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}}}{{u}^{2}}\)  to  \(\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}{u}^{2}}\).
\[px=-\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}{u}^{2}}\]
Divide both sides by \(x\).
\[p=-\frac{\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}{u}^{2}}}{x}\]
Simplify  \(\frac{\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}{u}^{2}}}{x}\)  to  \(\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}{u}^{2}x}\).
\[p=-\frac{2B}{SiemA\imath {m}^{3}lfr{a}^{2}{u}^{2}x}\]
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