Free Online 11+ Maths Tutoring – Open to All
Free Online 11+ Maths Tutoring – Open to All Hi! I’m Rithvik Muthuvelu , a GCSE student at King Edward’s School, Birmingham , and I’m offering free weekly online maths sessions to help students prepare for the 11+ entrance exams . These sessions are open to anyone who wants to improve their maths skills—no school restrictions. What You’ll Get Free weekly online maths classes Focused 11+ preparation : problem-solving, arithmetic, word problems, exam strategies Small-group format for better interaction Ideal for Year 4 and Year 5 students How to Join Weekly Session: Saturdays at 2:00 PM Google Meet Link: https://meet.google.com/nrk-iwmh-gij Contact Email: rithvikmu1@gmail.com If your child is preparing for the 11+ and would like extra support, feel free to join the class or get in touch. Looking forward to helping more students learn and grow! — Rithvik Muthuvelu
Let's start by calculating how far the first train (from Station A) has traveled by the time the second train (from Station B) starts moving at 9:00 AM.
ReplyDeleteThe time between 8:15 AM and 9:00 AM is 45 minutes, which is (45/60) = 0.75 hours.
In this time, the first train covers: Distance = 60 km/h × 0.75 hours = 45 km
After 9:00 AM, the remaining distance between the two trains is: 225 km − 45 km = 180 km
Now, both trains are moving towards each other. The combined speed of the two trains is: 60 km/h + 75 km/h = 135 km/h
To find the time taken for the trains to meet, use the formula: Time = Distance ÷ Speed = 180 km ÷ 135 km/h = 1.33 hours = 1 hour and 20 minutes
The second train started at 9:00 AM, so adding 1 hour and 20 minutes to 9:00 AM gives: 9:00 AM + 1 hour and 20 minutes = 10:20 AM
The two trains will meet at 10:20 AM.