A bacterial infection in an internal wound grows as \(\mathrm{N}^{\prime}(\mathrm{t})=\) \(\math....

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A bacterial infection in an internal wound grows as \(\mathrm{N}^{\prime}(\mathrm{t})=\) \(\mathrm{N}_{\mathrm{o}} \exp (\mathrm{t})\), where the time \(\mathrm{t}\) is in hours. A dose of antibiotic, taken orally, needs 1 hour to reach the wound. Once it reaches there, the bacterial population goes down as \(\frac{\mathrm{dN}}{\mathrm{dt}}=-5 \mathrm{~N}^2\). What will be the plot of \(\frac{\mathrm{N}_0}{\mathrm{~N}}\) vs \(\mathrm{t}\) after 1 hour? 📲PW App Link - https://bit.ly/YTAI_PWAP 🌐PW Website - https://www.pw.live



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