I'm looking to solve this equation mentally, with the following numbers, using an algebra shortcut.
$$a = bc + \frac{1}{2} dc^2$$
with
$$
\begin{eqnarray*}
c &=& 10.204,
\\ d &=& -9.8,
\\ b &=& 100.
\end{eqnarray*}
$$
Can anyone think of a shortcut that would make solving this easier?
Solve math equation mentally with algebra shortcut
3
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algebra-precalculus
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0A downvote is useful only when accompanied by some comment explaining it :-). – 2011-09-05
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0Can someone please explain why this question was downvoted? – 2011-09-05
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0Xaav, To clarify, I did not do it. I was in fact requesting for such an explanation. Also, I think this question is interesting and within the scope of the site. – 2011-09-05
1 Answers
6
HINT $\ $ Since $\rm\ \ d\:c\ \approx\ (0.2+10)\:(0.2-10)\ =\ 0.04-100\:,\ $ we conclude that
$\rm\ \ c\ (b+dc/2)\ \approx\ 10.2 * (100 + (0.04-100)/2)\ \approx\ 10.2 * (50 + 0.02)\ \approx\ 510.204$
The above mental approximation is very close to the actual value - which is $\ \: 510.20404$