To find the integral of titer + 2/sqrt(titer), we can split this into two separate integrals.
First, let's find the integral of titer. Since there is no function in the integrand, the integral is simply the antiderivative of titer, which is (1/2)*titer^2.
Next, let's find the integral of 2/sqrt(titer). We can rewrite this as 2*titer^(-1/2). Applying the power rule of integration, we add 1 to the exponent and divide by the new exponent:
∫2/sqrt(titer) dtiter = 2*(titer^(1/2)) / (1/2) = 4*sqrt(titer).
Combining the two integrals, the integral of titer + 2/sqrt(titer) is (1/2)*titer^2 + 4*sqrt(titer) + C, where C is the constant of integration.
Integral of titer+2/square root of titer
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