A 2.5 cm tall candle flame is 1.7 m from a wall. You happen to have...

A 7·cm tall candle is placed 175·cm from a lens with a focal length of +35·cm....

A 7·cm tall candle is placed 175·cm from a lens with a focal length of +35·cm. Note: enter the absolute value of your answers for all distances and heights ... use the signs to determine the type and orientation of the images. (a) How far from the lens will the image be?   cm. (b) How tall will the image be?   cm Now, imagine that the candle is moved closer, so that it is only 14·cm from the lens. (d) How far from...

A 2.5-cm-tall object is 30 cm to the left of a lens with a focal length...

A 2.5-cm-tall object is 30 cm to the left of a lens with a focal length of 15 cm . A second lens with a focal length of 48 cm is 62 cm to the right of the first lens. Calculate the distance between the final image and the second lens. Calculate the image height.

A 16·cm tall candle is placed 15·cm from a lens with a focal length of 10·cm....

A 16·cm tall candle is placed 15·cm from a lens with a focal length of 10·cm. A second identical lens is placed 20·cm past the first. Note: enter the absolute value of your answers for all distances and heights ... use the signs to determine the type and orientation of the images. (a) How far past the second lens will the final image be? cm (b) How tall will the final image be? cm (c) Which of the following describes...

An object 13 cm tall is located 37cm from a converging lens with a focal length...

An object 13 cm tall is located 37cm from a converging lens with a focal length of 45cm. Find the location and height of the image, and whether the image is upright or inverted, and whether it’s real or virtual.

A 1.7 m tall shoplifter is standing 3.9 m from a convex security mirror. The store...

A 1.7 m tall shoplifter is standing 3.9 m from a convex security mirror. The store manager notices that the shoplifters image in the mirror appears to be 13 cm tall. What is the magnification of the image in the mirror? Where is his image? cm  in front of  behind  the the mirror. What is the focal length of the mirror? cm What is its radius of curvature? cm

A 2.00-cm-tall object is located 18.0 cm in front of a converging lens with a focal...

A 2.00-cm-tall object is located 18.0 cm in front of a converging lens with a focal length of 30.0 cm. (a) Use the lens equation and (b) a ray diagram to describe the type, location, and height of the image that is formed.

A 3.0-cm-tall object is placed 45.0 cm from a diverging lens having a focal length of...

A 3.0-cm-tall object is placed 45.0 cm from a diverging lens having a focal length of magnitude 20.0 cm. a) What is the distance between the image and the lens? b) Is the image real or virtual? c) What is the height of the image?

A 76 cm tall object is placed 238 mm in front of a diverging lens with...

A 76 cm tall object is placed 238 mm in front of a diverging lens with a focal length of magnitude 650 mm. Find the location of the image. di = mm Find the magnification of the image. M = Find the image height. hi = mm

A 3 cm. "tall" object is placed 25 cm. from a convex lens with a focal...

A 3 cm. "tall" object is placed 25 cm. from a convex lens with a focal length of 50 cm. Determine at what distance a focused image will appear. Determine the height of this image. Create a sketch (ray diagram) showing the scenario described above labeled as “A” and a scenario where everything is the same except the focal length of the lens is changed to 12.5 cm.

A 1.9-cm-tall object is 20 cm to the left of a lens with a focal length...

A 1.9-cm-tall object is 20 cm to the left of a lens with a focal length of 10 cm . A second lens with a focal length of -7 cm is 34 cm to the right of the first lens. Calculate the distance between the final image and the second lens. Calculate the image height.