0 %
Výpočet objemu
Z daných vztahů vyjádři veličinu uvedenou v závorce:
\large V=\Large\frac{\pi}{4}\large\left(D^2-d^2\right)v\:\:\:\:\:\left[D\right]=?
\large D = \sqrt {\Large \frac{{4V+{d^{2}}v\pi }}{{v \pi}}\large } = \Large \frac{{\sqrt {4V+{d^{2}}v\pi }}}{{\sqrt {v\pi}}}\large
\large D = \sqrt {\Large \frac{{4V-{d^{2}}v\pi }}{{v \pi}}\large } = \Large \frac{{\sqrt {4V-{d^{2}}v\pi }}}{{\sqrt {v\pi}}}\large
\large D = \sqrt {\Large \frac{{4V+{d^{2}}v\pi }}{{v \pi}}\large } = \Large \frac{{\sqrt {4V+{d^{2}}v\pi }}}{{v\pi}}\large
\large D = \sqrt {\Large \frac{{4V+{d^{2}}v\pi }}{{v \pi}}\large } = \Large \frac{{\sqrt {4V+{d^{2}}v\pi }}}{{\sqrt {v\pi}}}\large + 1