Answer to Question #326076 in Algebra for Baylea

Let "m_0 = 820 \\space g,"

"\\alpha = 26.8\\space\\% = 0.268,"

"T = 18\\space min,"

"m_t" - mass we have after time of decay "t"

We have:

"m_{t + 1} = m_t(1 - \\alpha)"

This is a geometric progression with a common ratio equal to "(1 - \\alpha)"

Its general term is represented by the formula "m_t = m_0(1 - \\alpha)^t"

"m_T = m_0(1 - \\alpha)^T =\\\\\n= 820\\cdot(1 - 0.268)^{18}\\space g = 3.0\\space g"