51 = -3E-06x^2 + 0.0241x + 35.702
You asked:
Investigate the equation: \(51 = -\left( 3 E \right) - 06 \cdot {x}^{2} + 0.0241 x + 35.702\).
MathBot Answer:
The graph of the equation \(51 = -\left( 3 E \right) - 06 \cdot {x}^{2} + 0.0241 x + 35.702\) is a parabola.
The coordinates of its vertex are: \(\left(- \frac{36715141919}{7200000000}, \frac{241}{120000}\right)\)
The coordinates of its focus are: \(\left(- \frac{37615141919}{7200000000}, \frac{241}{120000}\right)\)
The directrix has equation: \(- 8 E - \frac{35815141919}{900000000} = 0\).
The parabola has parameterization: \[\begin{aligned}E\left(\theta\right) &= - \frac{36715141919}{7200000000} - 2 \theta^{2}\\x\left(\theta\right) &= \frac{241}{120000} + \theta\end{aligned}\]