- 36,34 = 11,11 \Delta t - 4,9 \Delta t ^ { 2 }
Solve for Δ
\Delta =-\frac{1817}{50t\left(-\frac{49t}{10}+11,11\right)}
t\neq \frac{1111}{490}\text{ and }t\neq 0
Solve for t
t=\frac{5\left(\sqrt{\Delta \left(\frac{1234321\Delta }{10000}+712,264\right)}+\frac{1111\Delta }{100}\right)}{49\Delta }
t=\frac{-\frac{5\sqrt{\Delta \left(\frac{1234321\Delta }{10000}+712,264\right)}}{49}+\frac{1111\Delta }{980}}{\Delta }\text{, }\Delta >0\text{ or }\Delta \leq -\frac{7122640}{1234321}
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11,11\Delta t-4,9\Delta t^{2}=-36,34
Swap sides so that all variable terms are on the left hand side.
\left(11,11t-4,9t^{2}\right)\Delta =-36,34
Combine all terms containing \Delta .
\left(-\frac{49t^{2}}{10}+\frac{1111t}{100}\right)\Delta =-36,34
The equation is in standard form.
\frac{\left(-\frac{49t^{2}}{10}+\frac{1111t}{100}\right)\Delta }{-\frac{49t^{2}}{10}+\frac{1111t}{100}}=-\frac{36,34}{-\frac{49t^{2}}{10}+\frac{1111t}{100}}
Divide both sides by 11,11t-4,9t^{2}.
\Delta =-\frac{36,34}{-\frac{49t^{2}}{10}+\frac{1111t}{100}}
Dividing by 11,11t-4,9t^{2} undoes the multiplication by 11,11t-4,9t^{2}.
\Delta =-\frac{1817}{50t\left(-\frac{49t}{10}+11,11\right)}
Divide -36,34 by 11,11t-4,9t^{2}.
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