Example

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

Question

$$\left. \begin{array} { l } { 0.37 , 8 = 10 } \\ { \frac { 2 x + 0 } { x } = \frac { 2 } { 10 } \times 50 \times 0.037 = } \\ { x ^ { 2 } \sin ^ { 2 } 0 } \\ { x ^ { 2 } \sin ^ { 2 } 0 } \end{array} \right.$$

Answer

x=(355000*sin(37))/(7511*deg*g)

Solution


Simplify  \({50}^{2}\)  to  \(2500\).
\[g\times 10150x\times 37deg=7100\times 2500\sin{37}\]
Simplify  \(g\times 10150x\times 37deg\)  to  \(375550gxdeg\).
\[375550gxdeg=7100\times 2500\sin{37}\]
Regroup terms.
\[375550deggx=7100\times 2500\sin{37}\]
Simplify  \(7100\times 2500\sin{37}\)  to  \(17750000\sin{37}\).
\[375550deggx=17750000\sin{37}\]
Divide both sides by \(375550\).
\[deggx=\frac{17750000\sin{37}}{375550}\]
Simplify  \(\frac{17750000\sin{37}}{375550}\)  to  \(\frac{355000\sin{37}}{7511}\).
\[deggx=\frac{355000\sin{37}}{7511}\]
Divide both sides by \(deg\).
\[gx=\frac{\frac{355000\sin{37}}{7511}}{deg}\]
Simplify  \(\frac{\frac{355000\sin{37}}{7511}}{deg}\)  to  \(\frac{355000\sin{37}}{7511deg}\).
\[gx=\frac{355000\sin{37}}{7511deg}\]
Divide both sides by \(g\).
\[x=\frac{\frac{355000\sin{37}}{7511deg}}{g}\]
Simplify  \(\frac{\frac{355000\sin{37}}{7511deg}}{g}\)  to  \(\frac{355000\sin{37}}{7511degg}\).
\[x=\frac{355000\sin{37}}{7511degg}\]
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