Use the equation below to find v, if =u18, =a6, and =t4.
=v+uat
Given:
u = 18
a = 6
t = 4
We need to find v.
Using the equation v = u + at, substitute the given values:
v = (18) + (6)(4)
v = 18 + 24
v = 42
Therefore, v = 42.
sorry it u +at
Apologies for the confusion. The correct equation is:
v = u + at
Given:
u = 18
a = 6
t = 4
Substituting the values:
v = (18) + (6)(4)
v = 18 + 24
v = 42
Therefore, the value of v is 42.
To solve for v, we can rearrange the equation and substitute the given values for u, a, and t.
Given:
u = 18
a = 6
t = 4
Substituting these values into the equation:
v + uat = 0
v + (18)(6)(4) = 0
v + 432 = 0
Now, we can isolate v by subtracting 432 from both sides:
v = -432
To find the value of v using the given equation:
v + u * a * t = 0
where u = 18, a = 6, and t = 4,
Substituting the given values into the equation:
v + (18) * (6) * (4) = 0
Now, simplify the equation:
v + 432 = 0
To isolate the variable v, subtract 432 from both sides of the equation:
v + 432 - 432 = 0 - 432
This gives:
v = -432
Therefore, the value of v is -432.