a body travelling with uniform acceleration along a straight line across two points A and B with velocity is 20 m per second and 30 M per second respectively the speed of body at the midpoint of a and b is
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Hey,
Let the the midpoint of AB be M and A and B are S m apart. Also, let acceleration of the body is A m/s²
Let velocity of body-
At A be U = 20 m/s
At B be V = 30 m/s
At C be W
For uniform acceleration motion, we know that
v² = u² + 2as
Now, here u = U, a = A, s = S, v = V.
Therefore, V² = U² + 2AS => S = (V² - U²)/2A—(1)
Now, for point M, s = S/2, u = U, v = W.
Therefore, W² = U² + 2A(S/2) => W² = U² + AS
Putting value of S in above equation from equation (1)—
W² = U² + A(V² - U²)/2A = U² + (V² - U²)/2
=> W² = (U² + V²)/2 => W =√(U²+V²)/2(U²+V²)/2
Now, put the values
W² = (20²+30²)/2 = (400+900)/2 = 1300/2 =650
W = √650
Approx 25.5 m/s...
HOPE IT HELPS:-))
Let the the midpoint of AB be M and A and B are S m apart. Also, let acceleration of the body is A m/s²
Let velocity of body-
At A be U = 20 m/s
At B be V = 30 m/s
At C be W
For uniform acceleration motion, we know that
v² = u² + 2as
Now, here u = U, a = A, s = S, v = V.
Therefore, V² = U² + 2AS => S = (V² - U²)/2A—(1)
Now, for point M, s = S/2, u = U, v = W.
Therefore, W² = U² + 2A(S/2) => W² = U² + AS
Putting value of S in above equation from equation (1)—
W² = U² + A(V² - U²)/2A = U² + (V² - U²)/2
=> W² = (U² + V²)/2 => W =√(U²+V²)/2(U²+V²)/2
Now, put the values
W² = (20²+30²)/2 = (400+900)/2 = 1300/2 =650
W = √650
Approx 25.5 m/s...
HOPE IT HELPS:-))
siddharth1702:
thank u so much
for your answer
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