If diana walks forward and her angle looking to the top of the building changes to 40°, how much closer is she to the building? round the answer to the nearest tenth of a foot. 10.3 ft 17.6 ft 30.2 ft 97.2 ft
If Diana Walks Forward And Her Angle Looking To The Top Of The Building Changes To 40°, How Much Closer Is She To The Building? Round The Answer To The Nearest Tenth Of A Foot. 10.3 Ft 17.6 Ft 30.2 Ft 97.2 Ft
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If Diana Walks Forward And Her Angle Looking To The Top Of The Building Changes To 40°, How Much Closer Is She To The Building? Round The Answer To The Nearest Tenth Of A Foot. 10.3 Ft 17.6 Ft 30.2 Ft 97.2 Ft. We need the initial angle of elevation before she moved to use the tangent. Round the answer to the nearest tenth of a foot.
SOLVED Diana works in a building that is 130 feet tall. She is outside from www.numerade.com
If diana walks forward and her angle looking to the top of the building changes to 40°, how much closer is she to the building? If diana walks forward and her angle looking to the top of the building changes to 40∘, how much closer is she to the building? Round the answer to the nearest tenth of a foot.
The Closer Diana Gets To The Building, The Smaller The Angle Becomes Diana Is 17.6 Feet Closer To The Building
Use the tangent function to find the distance from diana's eyes to the top of the building when she is at the angle of 37 degrees. If diana walks forward and her angle looking to the top of the building changes to 40° , how much closer is she to the building? If diana walks forward and her angle looking to the top of the building changes to 40∘, how much closer is she to the building?
If Diana Walks Forward And Her Angle Looking To The Top Of The Building Changes To 40°, How Much Closer Is She To The Building?
The question does not provide enough information to calculate the distance diana moved closer to the building. The tangent of an angle in a right triangle is the ratio of the. Round the answer to the nearest tenth of a foot.
She Is From Of The Building Changes To 40° , How Much Closer Is She Outside, Looking Up At.
If diana walks forward and her angle looking to the top diana works in a building that is 130 feet tall. Round the answer to the nearest tenth of a foot. We need the initial angle of elevation before she moved to use the tangent.
Round The Answer To The Nearest Tenth Of A Foot.
To find out how much closer diana is to the building after her angle of elevation changes to 40°, we can use the tangent function from trigonometry.
