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1 Qian, who has just completed his first finance course, is unsure whether he should take a course in business analysis and valuation using financial statements because he believes that financial analysis adds little value, given the efficiency of capital markets. Explain to Qian when financial analysis can add value, even if capital markets are efficien

Intersection of Gaussian surface with xy plane Interactive Figure 23.3.1: A charged particle is located at the origin of an xyz coordinate system. A spherical mathematical surface, called a Gaussian surface, surrounds the particle. The next simulation (linked below) shows a two-dimensional cross section in the xy plane of Fig. 23.3.1. The particle of charge q is at the origin. The brown circle represents the Gaussian surface. (Remember that the circle in the simulation is a two-dimensional representation of a closed sphere in three-dimensions.) The electric field created by the particle fills all space. The direction, but not the magnitude, of that field is represented in the simulation by a series of orange arrows. By default, the Gaussian surface is centered at the origin. Simulation Gauss' Law: One Charge and Movable Gaussian Surface With the Gaussian surface centered at the origin, use information from the simulation to determine the charge q of the particle in microcoulombs. Enter the sign of the charge (positive or negative) in the blue box and a numerical value in the red box. 4enc HC the tolerance is +/-5%You will use Gauss's Law to calculate the electric field inside an insulating sphere of radius R constant charge density p=Qowl/Visual uniformly distributed throughout the sphere. Step 1: Find the charge enclosed by a spherical Gaussian surface of radius r