Lilyon on MSNOpinion
Understanding exponential equations in no time
Understanding exponential equations in no time!!
Ask ordinary software developers how to code an exponential function (that is, e x) and most will tell you to simply write an expression in their favorite high level language. But a significant slice ...
Remember one of the laws of logs: \(n{\log _a}x = {\log _a}{x^2}\) Another one of the laws are used here: \({\log _a}x + {\log _a}y = {\log _a}xy\) ...
Why populations explode, and why traces of radioactive elements can hang around for a very long time Exponential increases, and decreases, pop up quite often in various contexts. The word is generally ...
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