As there is no acceleration in X- direction the velocity will remains same in x direction and velocity in y diection can be find by equation of motion in Y- direction.
The pilot of an airplane pulls into a steep 40° climb at 300 km/h (83.33 m/s)...
A certain airplane has a speed of 315.8 km/h and is diving at an angle of θ = 25.0° below the horizontal when the pilot releases a radar decoy (see the figure). The horizontal distance between the release point and the point where the decoy strikes the ground is d = 789 m. (a) How long is the decoy in the air? (b) How high was the release point? With units
A certain airplane has a speed of 272.9 km/h and is diving at an angle of θ = 33.0° below the horizontal when the pilot releases a radar decoy (see the figure). The horizontal distance between the release point and the point where the decoy strikes the ground is d = 738 m. (a) How long is the decoy in the air? (b) How high was the release point?
A certain airplane has a speed of 289.4 km/h and is diving at an angle of θ = 25.0° below the horizontal when the pilot releases a radar decoy (see the figure). The horizontal distance between the release point and the point where the decoy strikes the ground is d = 738 m. (a) How long is the decoy in the air? (b) How high was the release point?
A certain airplane has a speed of 286.7 km/h and is diving at an angle of theta = 27.0 degree below the horizontal when the pilot releases a radar decoy (see the figure). The horizontal distance between the release point and the point where the decoy strikes the ground is d = 759 m. How long is the decoy in the air ? How high was the release point ? Number ________________ Units ______________ Number ________________ Units ______________
27) A certain airplane has a speed of 332.6 km/h and is diving at an angle of 0 = 26.0° below the horizontal when the pilot releases a radar decoy (see the figure). The horizontal distance between the release point and the point where the decoy strikes the ground is d = 645 m. (a) How long is the decoy in the air? (b) How high was the release point? Units (a) Number (b) Number Units
Chapter 04, Problem 027 A certain airplane has a speed of 303.7 km/h and is diving at an angle of - 2 between the release point and the point where the decoy strikes the ground is d-797 m. (a) How long is the decoy in the air? (b) How high was the 27.0e below the horizontal when the pilot releases a radar decoy (see the figure). The horizontal distance release point? (b) Number to search
An airplane with a speed of 84.8 m/s is climbing upward at an angle of 60.7 ° with respect to the horizontal. When the plane's altitude is 625 m, the pilot releases a package. (a) Calculate the distance along the ground, measured from a point directly beneath the point of release, to where the package hits the earth. (b) Relative to the ground, determine the angle of the velocity vector of the package just before impact. a) 883.95 m is...
An airplane with a speed of 91.2 m/s is climbing upward at an angle of 65.1 ° with respect to the horizontal. When the plane's altitude is 721 m, the pilot releases a package. (a) Calculate the distance along the ground, measured from a point directly beneath the point of release, to where the package hits the earth. (b) Relative to the ground, determine the angle of the velocity vector of the package just before impact.
An airplane with a speed of 89.9 m/s is climbing upward at an angle of 50.1 ° with respect to the horizontal. When the plane's altitude is 634 m, the pilot releases a package. (a) Calculate the distance along the ground, measured from a point directly beneath the point of release, to where the package hits the earth. (b) Relative to the ground, determine the angle of the velocity vector of the package just before impact.
An airplane with a speed of 83.8 m/s is climbing upward at an angle of 51.5 ° with respect to the horizontal. When the plane's altitude is 910 m, the pilot releases a package. (a) Calculate the distance along the ground, measured from a point directly beneath the point of release, to where the package hits the earth. (b) Relative to the ground, determine the angle of the velocity vector of the package just before impact.