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13 Nov 2019
Please help me . Itâs urgent . Can you solve step by step please . I need to show all my work .
S. How much work is required to pump the water out of the top of a half-full 10 foot long horizontal cylindrical tank that has radius 3 ft.? The weight density of the water is 62.4 %, Round to a whole number. (Sec. 8.4) (2 points) 6. Find the arc length of the graph of y between x = 0 and x-4 . (Sec. 8.4) (2 points) 7. Evaluate: Jis 5--6e"+5 8. A single infected individual enters a community of n susceptible individuals. Let x be the n In 7 dx (Sec. 8.4) (2 points) umber of newhy s that the disease spreads at a rate proportional infected individuals at time t. The common epidemic model assume I)(n-x). Solve for x to the product of the total number infected and the number not yet infected. So x kx+)Xn-x) as a function of t. Use the fact that x 0when t 0to find C after integrating. (Sec. 8.5) (2 points)
Please help me . Itâs urgent .
Can you solve step by step please . I need to show all my work .
S. How much work is required to pump the water out of the top of a half-full 10 foot long horizontal cylindrical tank that has radius 3 ft.? The weight density of the water is 62.4 %, Round to a whole number. (Sec. 8.4) (2 points) 6. Find the arc length of the graph of y between x = 0 and x-4 . (Sec. 8.4) (2 points) 7. Evaluate: Jis 5--6e"+5 8. A single infected individual enters a community of n susceptible individuals. Let x be the n In 7 dx (Sec. 8.4) (2 points) umber of newhy s that the disease spreads at a rate proportional infected individuals at time t. The common epidemic model assume I)(n-x). Solve for x to the product of the total number infected and the number not yet infected. So x kx+)Xn-x) as a function of t. Use the fact that x 0when t 0to find C after integrating. (Sec. 8.5) (2 points)
Tod ThielLv2
15 May 2019