Solve for x
100 x (1/2)^t/3.8
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y = 100 x (1/2)^t/3.8
trying to find the derivative
that is a direct application of the derivative of an exponential function
dy/dx = (1/3.8)(100)(1/2)^(t/3.8))(ln 1/2)
= etc. (simplify the constants)
To solve for x in the expression 100 x (1/2)^(t/3.8), we can follow these steps:
Step 1: Determine the exponent term.
The exponent in the expression is (t/3.8). It means that we need to divide t by 3.8.
Step 2: Calculate the value of the fraction (1/2)^(t/3.8).
To do this, we substitute the value of (t/3.8) into the formula (1/2)^n, where n is the value of (t/3.8). In this case, n is equal to (t/3.8).
Step 3: Evaluate the exponent fraction.
Calculate the value of (t/3.8) and raise 1/2 to that power.
Step 4: Multiply the result from Step 3 by 100.
Lastly, multiply the result obtained in Step 3 by 100 to find the final value of x.
By following these steps, you can solve for x in the given expression.