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Solve the following completely (given required, Free-body diagram(if applicable), formula, solution, and answer), USE PROPER UNITS AND ENCIRCLE YOUR FINAL ANSWER.
2.Find the electric flux through a cylinder with a distance of 22 cm and a height of 35 cm with a charge of 5.42 μC. ( use the general formula of flux and the area of cylinder is 2𝜋rh + 2𝜋r²)
Four balls are drawn in succession without replacement from an urn containing 8 red balls, 5 green balls. Let T be the random variable representing the number of red balls. Find the values of the random variable T. Complete the table.
Due to substantial increases in prices in Country A, the real income level of the population in Country A decreases. Show on a diagram how the decrease in the income level in Country A will affect the demand for meat, which is a normal good. Also indicate how the equilibrium price and equilibrium quantity of meat will change in Country A. The direction of any changes should be clearly indicated using arrows. Note that your diagrams should be properly annotated and that marks will be deducted for any missing labels on your diagram.
Suppose three televisions are tested randomly. We want to find out the number of substandard condition. If we let Y be the random variable representing the number of substandard televisions, will you show the values of the random variable Y? Complete the table below to show the values of the random variable.
Find the magnitude of the charge if it has a Voltage of 13 V with a distance of 25 mm
Find the Potential Energy of a charge with 99 μC with a potential difference of 15 V
Two-point charges reacted with each other to produce 4.32 x 10⁻⁴ J. the magnitude of q is 30 nC with a distance from the point charge of 20 cm. Find the magnitude of the point charge
Find the electric flux through a cylinder with a distance of 24 cm and a height of 37 cm with a charge of 5.42 μC. ( use the general formula of flux and the area of cylinder is 2𝜋rh + 2𝜋r²)
Find the electric flux in a sphere of radius 0.50 cm from a charge of 60 nC
A basket contains 6 ripe and 2 unripe bananas. If three bananas are taken from the baskets one after the other, determine the possible values of the random variable R representing the number of ripe bananas.
