It's great to understand linear relationships because if we can identify these kinds of relationships in everyday situations, we can solve all kinds of problems!
For example, what if we wanted to compare the cost of mobile plans between two companies? We definitely want to know which plan will cost the least so we can get the best deal.
Kerry currently pays $\$50$$50 a month for her internet service. She is planning to switch to a fibre optic cable service.
a) Write an equation for the total cost $T$T of Kerry's current internet service over a period of $n$n months.
b) For the fibre optic cable service, Kerry pays a one-off amount of $\$1200$$1200 for the installation costs and then a monthly fee of $\$25$$25. Write an equation of the total cost $T$T of Kerry's new internet service over $n$n months.
c) Fill in the table of values for the total cost of the current internet service, given by $T=50n$T=50n.
d) Fill in the table of values for the total cost of the fibre optic cable service, given by $T=25n+1200$T=25n+1200.
Describe the meaning of the slope and y-intercept for a linear relation arising from a realistic situation and describe a situation that could be modelled by a given linear equation
Determine other representations of a linear relation, given one representation