The integral form of the exponential growth equation is given by:

N(t) = N0 * e^(rt)

Where:
N(t) is the quantity at time t,
N0 is the initial quantity (at time t=0),
r is the growth rate,
e is the base of natural logarithms (approximately equal to 2.71828),
t is the time.

This equation is derived from the differential form of the exponential growth equation, dN/dt = rN, by integrating both sides with respect to time.

Question

The integral form of the exponential growth equation is given by:

N(t) = N0 * e^(rt)

Where:
N(t) is the quantity at time t,
N0 is the initial quantity (at time t=0),
r is the growth rate,
e is the base of natural logarithms (approximately equal to 2.71828),
t is the time.

This equation is derived from the differential form of the exponential growth equation, dN/dt = rN, by integrating both sides with respect to time.

Knowee AI · Accepted Answer

The integral form of the exponential growth equation is given by:

N(t) = N0 * e^(rt)

Where:
N(t) is the quantity at time t,
N0 is the initial quantity (at time t=0),
r is the growth rate,
e is the base of natural logarithms (approximately equal to 2.71828),
t is the time.

This equation is derived from the differential form of the exponential growth equation, dN/dt = rN, by integrating both sides with respect to time.

The integral form of exponential growth equation is

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