Petiol tank currently holds 65 litres. He travels xhours. consuming petrol at 3 litres per hour. than it decideg to quicken the sped, increasing petrol censumption at 5 litres per hour whilst driving for \( y \) hours there after. Determine the a igebrac experssion for the remaining lit of petrol left.

To find the remaining litres of petrol left in Petiol's tank, we start with the initial amount of petrol, which is 65 litres. After travelling for \( x \) hours at a consumption rate of 3 litres per hour, the amount of petrol consumed during this time is \( 3x \) litres. Then, Petiol quickens his speed, and for \( y \) hours, he consumes petrol at a rate of 5 litres per hour, leading to an additional petrol consumption of \( 5y \) litres. So, the total amount of petrol consumed is \( 3x + 5y \) litres. Therefore, the remaining litres of petrol can be expressed as: \[ 65 - (3x + 5y) \] This simplifies to: \[ 65 - 3x - 5y \] Voilà! That's your algebraic expression for the remaining petrol. Safe travels!