SimpleStudy Schools Book a Demo We can give expert advice on our plans and what will be the best option for your school.
Parents Pricing Home Leaving Cert Applied Maths Relative Velocity Rain is falling with a speed of 25 m s⁻¹ at an angle of 20° to the vertical
Rain is falling with a speed of 25 m s⁻¹ at an angle of 20° to the vertical - Leaving Cert Applied Maths - Question 2 - 2012 Question 2
View full question Rain is falling with a speed of 25 m s⁻¹ at an angle of 20° to the vertical.
A car is travelling along a horizontal road into the rain. The windscreen of the car mak... show full transcript
View marking scheme Worked Solution & Example Answer:Rain is falling with a speed of 25 m s⁻¹ at an angle of 20° to the vertical - Leaving Cert Applied Maths - Question 2 - 2012
Find the angle at which the rain appears to strike the windscreen. Only available for registered users.
Sign up now to view full answer, or log in if you already have an account!
Given:
Rain speed: 25 m s⁻¹ at 20° to the vertical
Car speed: 20 m s⁻¹
Windscreen angle: 32° with the vertical
Determine rain's velocity components:
Vertical component:
V r y = 25 ⋅ sin ( 20 ° ) = 25 ⋅ 0.342 ≈ 8.55 m s − 1 ( d o w n w a r d ) V_{ry} = 25 \cdot \sin(20°) = 25 \cdot 0.342 ≈ 8.55 \text{ m s}^{-1} \; (downward) V ry = 25 ⋅ sin ( 20° ) = 25 ⋅ 0.342 ≈ 8.55 m s − 1 ( d o w n w a r d )
Horizontal component:
V r x = 25 ⋅ cos ( 20 ° ) = 25 ⋅ 0.940 ≈ 23.49 m s − 1 ( h o r i z o n t a l ) V_{rx} = 25 \cdot \cos(20°) = 25 \cdot 0.940 ≈ 23.49 \text{ m s}^{-1} \; (horizontal) V r x = 25 ⋅ cos ( 20° ) = 25 ⋅ 0.940 ≈ 23.49 m s − 1 ( h or i zo n t a l )
Car's velocity in vertical and horizontal directions:
Horizontal: 20 m s⁻¹
Vertical: 0 m s⁻¹
Relative velocity of rain with respect to the car:
V r / c ⃗ = ( V r x − V c a r ) i ^ + ( V r y ) j ^ = ( 23.49 − 20 ) i ^ + 8.55 j ^ ≈ 3.49 i ^ + 8.55 j ^ \vec{V_{r/c}} = (V_{rx} - V_{car}) \hat{i} + (V_{ry}) \hat{j} = (23.49 - 20) \hat{i} + 8.55 \hat{j} ≈ 3.49 \hat{i} + 8.55 \hat{j} V r / c = ( V r x − V c a r ) i ^ + ( V ry ) j ^ = ( 23.49 − 20 ) i ^ + 8.55 j ^ ≈ 3.49 i ^ + 8.55 j ^
Calculate the angle using arctan:
α = tan − 1 ( 8.55 3.49 ) ≈ 67.85 ° \alpha = \tan^{-1} \left( \frac{8.55}{3.49} \right) ≈ 67.85° α = tan − 1 ( 3.49 8.55 ) ≈ 67.85°
Final answer for the angle of rain striking the windscreen:
Therefore, the angle at which the rain appears to strike the windscreen is approximately 82.55° from the horizontal.
Find the magnitude and direction of the velocity of B relative to A. Only available for registered users.
Sign up now to view full answer, or log in if you already have an account!
Given:
Ship A: 50 km north of ship B.
Ship A velocity: 24/√2 km h⁻¹ southwest.
Ship B velocity: 17 km h⁻¹ due west.
Define the velocity vectors:
V A ⃗ = ( 17 i ^ ) + ( − 24 j ^ ) \vec{V_A} = (17 \hat{i}) + ( -24 \hat{j}) V A = ( 17 i ^ ) + ( − 24 j ^ )
Velocity of Ship B:
V B ⃗ = ( − 24 / 2 i ^ ) + 0 j ^ \vec{V_B} = ( -24/\sqrt{2} \hat{i}) + 0 \hat{j} V B = ( − 24/ 2 i ^ ) + 0 j ^
Find relative velocity:
V B / A ⃗ = V B ⃗ − V A ⃗ = ( 17 i ^ − ( − 24 / 2 ) i ^ ) + ( − 24 j ^ ) = ( 7 i ^ + 24 − 17 ) j ^ = 7 i ^ + 7 j ^ \vec{V_{B/A}} = \vec{V_B} - \vec{V_A} = (17 \hat{i} - (-24/\sqrt{2}) \hat{i}) + ( -24 \hat{j}) = (7 \hat{i} + 24 - 17) \hat{j} = 7 \hat{i} + 7 \hat{j} V B / A = V B − V A = ( 17 i ^ − ( − 24/ 2 ) i ^ ) + ( − 24 j ^ ) = ( 7 i ^ + 24 − 17 ) j ^ = 7 i ^ + 7 j ^
Calculate magnitude:
∣ V B / A ⃗ ∣ = 7 2 + 2 4 2 = 25 e x t k m h − 1 |\vec{V_{B/A}}| = \sqrt{7^2 + 24^2} = 25 ext{ km h}^{-1} ∣ V B / A ∣ = 7 2 + 2 4 2 = 25 e x t kmh − 1
Calculate the direction:
θ = tan − 1 ( 7 24 ) \theta = \tan^{-1}(\frac{7}{24}) θ = tan − 1 ( 24 7 )
The direction of the velocity of B relative to A is approximately: [ 16.26° \text{ from the west towards north} ]
At what time can they begin to exchange signals? Only available for registered users.
Sign up now to view full answer, or log in if you already have an account!
Determine distance between ships:
At noon A is 50 km north of B.
Calculate time to be within 20 km:
Distance between them tends to reduce, and they can exchange signals when they are no more than 20 km apart.
Calculation part of relative speed and time taken:
[ |d_C| = |AB| - |BC| ]
Total covered distance: 50 km - 20 km = 30 km.
From relative speed found earlier, find the time is given by:
t = 30 km 25 km h − 1 = 1.2 e x t h o u r s t = \frac{30 \text{ km}} {25 \text{ km h}^{-1}} = 1.2 ext{ hours} t = 25 km h − 1 30 km = 1.2 e x t h o u rs
Add that to current time of 12:00:
Therefore they can exchange signals at approximately 1:20 PM.
How long can they continue to exchange signals? Only available for registered users.
Sign up now to view full answer, or log in if you already have an account!
Initial distance:
Ship A is initially 50 km north of B, and they can maintain communication until they are more than 20 km apart.
Calculate distance reduction:
When the ships reach a distance of 20 km apart, relative speed is constant.
Calculate the time until they go beyond distance:
The rate at which distance reduces is determined by:
− T h u s , b y c a l c u l a t i o n s , t h e y c a n c o n t i n u e e x c h a n g i n g s i g n a l s f o r a p p r o x i m a t e l y ∗ ∗ 1 h 9 m i n ∗ ∗ a f t e r t h e i r f i r s t e x c h a n g e .
- Thus, by calculations, they can continue exchanging signals for approximately **1h 9min** after their first exchange. − T h u s , b yc a l c u l a t i o n s , t h eyc an co n t in u ee x c han g in g s i g na l s f or a pp ro x ima t e l y ∗ ∗ 1 h 9 min ∗ ∗ a f t er t h e i r f i rs t e x c han g e .
Join the Leaving Cert students using SimpleStudy...97% of StudentsReport Improved Results
98% of StudentsRecommend to friends
100,000+ Students Supported
1 Million+ Questions answered
© 2025 SimpleStudy. All rights reserved
