Projectile Motion A golfer hits a golf ball with an initial velocity of 100 miles per hour. The range R of the ball as a function of the angle θ to the horizontal is given by R ( θ ) = 672 sin ( 2 θ ) , where R is measured in feet. a. At what angle θ should the ball be hit if the golfer wants the ball to travel 450 feet (150 yards)? b. At what angle θ should the ball be hit if the golfer wants the ball to travel 540 feet (180 yards)? c. At what angle θ should the ball be hit if the golfer wants the ball to travel at least 480 feet (160 yards)? d. Can the golfer hit the ball 720 feet (240 yards)?
Projectile Motion A golfer hits a golf ball with an initial velocity of 100 miles per hour. The range R of the ball as a function of the angle θ to the horizontal is given by R ( θ ) = 672 sin ( 2 θ ) , where R is measured in feet. a. At what angle θ should the ball be hit if the golfer wants the ball to travel 450 feet (150 yards)? b. At what angle θ should the ball be hit if the golfer wants the ball to travel 540 feet (180 yards)? c. At what angle θ should the ball be hit if the golfer wants the ball to travel at least 480 feet (160 yards)? d. Can the golfer hit the ball 720 feet (240 yards)?
Solution Summary: The author explains that the golfer hits a golf ball with an initial velocity of 100 miles per hour. The range R of the ball is given by R ( ) = 672 sin.
Projectile Motion A golfer hits a golf ball with an initial velocity of 100 miles per hour. The range
of the ball as a function of the angle
to the horizontal is given by
, where
is measured in feet.
a. At what angle
should the ball be hit if the golfer wants the ball to travel 450 feet (150 yards)?
b. At what angle
should the ball be hit if the golfer wants the ball to travel 540 feet (180 yards)?
c. At what angle
should the ball be hit if the golfer wants the ball to travel at least 480 feet (160 yards)?
d. Can the golfer hit the ball 720 feet (240 yards)?
a
->
f(x) = f(x) = [x] show that whether f is continuous function or not(by using theorem)
Muslim_maths
Use Green's Theorem to evaluate F. dr, where
F = (√+4y, 2x + √√)
and C consists of the arc of the curve y = 4x - x² from (0,0) to (4,0) and the line segment from (4,0) to
(0,0).
Evaluate
F. dr where F(x, y, z) = (2yz cos(xyz), 2xzcos(xyz), 2xy cos(xyz)) and C is the line
π 1
1
segment starting at the point (8,
'
and ending at the point (3,
2
3'6
Elementary Statistics: Picturing the World (7th Edition)
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Fundamental Theorem of Calculus 1 | Geometric Idea + Chain Rule Example; Author: Dr. Trefor Bazett;https://www.youtube.com/watch?v=hAfpl8jLFOs;License: Standard YouTube License, CC-BY