Suppose an electron (q = - e= - 1.6 × 1019 C,m=9.1×10¬³' kg) is accelerated from rest through a potential difference of Vab = +5000 V. Solve for the final speed of the electron. Express numerical answer in two significant figures. The potential energy U is related to the electron charge (-e) and potential Vab is related by the equation: U = Assuming all potential energy U is converted to kinetic energy K, K+U = 0 K= -U 1 Since K=mv and using the formula for potential energy above, we arrive at an equation for speed: v= ( 1/2 Plugging in values, the value of the electron's speed is: x 107 m/s V=

Suppose an electron (q = - e= - 1.6 × 1019 C,m=9.1×10¬³' kg) is accelerated from rest through a potential difference of Vab = +5000 V. Solve for the final speed of the electron. Express numerical answer in two significant figures. The potential energy U is related to the electron charge (-e) and potential Vab is related by the equation: U = Assuming all potential energy U is converted to kinetic energy K, K+U = 0 K= -U 1 Since K=mv and using the formula for potential energy above, we arrive at an equation for speed: v= ( 1/2 Plugging in values, the value of the electron's speed is: x 107 m/s V=