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In Calculus there is the branch of integration. Find the area under the curve is the time
we need to use it. It's the original function of the differentiation. So you need to find
primitive function. Do we approximate? Do we use the Trapezoidal
Rule or Simpson's Rule? Because the Simpson's Rule's more accurate to approximate. Divide
it into 'n' sub intervals to approximate, integral definite.
Any function for integration but different rules. Use different rules. Not all equations
can integrate so differentiate to integrate. Yes you need to differentiate to integrate.
Integration time. gration time, in in in in integration time. gration time in in in in
integration time. Integrate that function. in in in in integration time. Integrate that
function in in in in integrate. Pie function squared is the volume round the
x axis. Does it have coordinates or is in finite? Rearranging the equation so that we
can integrate it so that we get one hundred percent.
Exponential's same. Trig functions sine and cos, sec squared to tan, inverse function's
integral is log, inverse root integral is inverse trig. Bounded by the x or the y axis.
Don't forget the 'C' for integral infinite. Any function for integration but different
rules. Use different rules. Not all equations can integrate so differentiate to integrate.
Yes you need to differentiate to integrate. Integration time. gration time, in in in in
integration time. gration time in in in in integration time. Integrate that function.
in in in in integration time. Integrate that function in in in in integrate.
Inverse trig, exponential, log and trig. Any integratable function is fine by me. For the
HSC its an essentialty to integrate expertly for a higher E. You know what I'm sayin'?
Integration Time! Integrate that function. in in in in integration time. Integrate that
function in in in in integrate. Integration Time