A student stands do = 2.4 m in front of a floor-to-ceiling mirror. Her eyes are he = 1.54 m above the floor and she holds a flashlight at a distance hf = 0.75 m above the floor.
Calculate the angle θ, in degrees, that the flashlight makes with respect to the floor if the light is reflected into her eyes
A student stands do = 2.4 m in front of a floor-to-ceiling mirror. Her eyes are...
A person whose eyes are 1.70 m above the floor stands in front of a plane mirror. The top of her head is 0.140 m above her eyes. (a) What is the height of the shortest mirror in which she can see her entire image? (b) How far above the floor should the bottom edge of the mirror be placed?
A woman is standing 0.4 m in front of a flat mirror. Her eyes are 1.5 m from the ground. The maximum height of the bottom of the mirror such that the woman can see the bottom of her feet in the mirror is [a] m. The angle of the reflected light ray from her feet to her eyes is [b]° with respect to the normal direction. Give both of your answers to two decimal places.
A person whose eyes are at a height H above the floor stands a distance L in front of a vertical plane mirror whose bottom edge is h above the floor , as seen in the figure below . Find an expression for the horizontal distance x to the base of the wall supporting the mirror of the nearest point on the floor that can be seen reflected in the mirror , Your expression should be in terms of the...
Suppose man stands in front of a mirror as shown in the figure below. His eyes are 1.71 m above the floor and the top of his head is 0.13 m higher. Find the height (in m) above the floor of the top and bottom of the smallest mirror in which he can see both the top of his head and his feet. top m bottom m How is the distance d from the top to the bottom of the...
A person whose eyes are H = 1.55 m above the floor stands 2.20 m in front of a vertical plane mirror whose bottom edge is 38 cm above the floor (Figure 1) .
a. His eyes are 1.79 m above the floor, and the top of his head is 0.13 m higher. Find the height (in m) above the floor of the top and bottom of the smallest mirror in which he can see both the top of his head and his feet. Top = ___m Bottom = ___m b. How is the distance d from the bottom of the mirror related to the man's height h? d = ___ Suppose a man...
Question G: Part 1, 2, 3 A6 ft tall woman stands vertically in front of a mirror, 2ft away from her. Her eyes are 5 ft above the floor. If she wants to see her freshly pedicured toes in the mirror, what is the maximum distance the bottom of the mirror must be from the bottom of the floor? Select one: 2.5 ft 1 ft 0.625 ft 3 feet It depends how far the woman is from the mirror A...
Jane's eyes are 1.11 m from the floor, and the top of her head is 1.62 m from the floor.(a) What is the minimum height of a vertical mirror that will allow Jane to see her full reflection?(b) How far from the floor should the top of the mirror be placed so that she can see her full reflection?
A flashlight is held at the edge of a swimming pool at a height h = 2.4 m such that its beam makes an angle of θ = 41 degrees with respect to the water's surface. The pool is d = 2.25 m deep and the index of refraction for air and water are n1 = 1 and n2 = 1.33, respectively.what is the horizontal distance, D, from the edge of the pool to the point on the bottom of...
A flat circular mirror of radius 0.150 m is lying on the floor. Centered directly above the mirror, at a height of 0.710 m, is a small light source. Calculate the diameter of the bright circular spot formed on the 3.10 m high ceiling by the light reflected from the mirror.