Business History


SERVING THE LAKES REGION SINCE 1950

Jordan Rentals is the oldest family run rental and real estate business in the Sebago/Long Lake region.    The office is owned by Steve & Elaine Titcomb. The cottage rental and real estate business was started by Steve’s aunt, Dorothy Jordan, back in the early 50’s when she owned Jordan’s Store which is next to our current office.  So many people were drawn to the area and inquired about buying or renting property that she started the business that remains in the same location today on Route 114 (Sebago Road), on the western shore of Sebago Lake.   Steve’s folks, Chek & Natalie Titcomb bought the property in the early 70’s and at that time joined the ERA Real Estate Franchise.  The office remained an independent ERA office until 1997 when they joined ERA Agency 1.  We are now a branch office of The Maine Real Estate Network, the largest independent Real Estate office in the State of Maine with 24 offices and over 400 Real Estate Agents. We cover Western Maine, The seacoast from Wells to Belfast, the greater Portland and Auburn areas.  

Jordan Rentals – – – aside from selling real estate at The Maine Real Estate Network, we manage 130 rental cottages on 14 area lakes and ponds, through our Maine vacation rental agency, Jordan Rentals. Maine cottage vacation rentals are available by the week, month or season, from late May to mid October. We call ourselves The Camp Counselors and work with you to choose the perfect cottage.  Elaine  and Sonia head up the rental office so give a call when you’re ready to start planning your Maine vacation.

Whether you are looking to rent a lakeside cabin on Sebago Lake, Long Lake or one of the many lakes we have to offer, or buy one of your own, we’re the people to talk to in the Sebago Lake Region. We offer old fashion, down home service. We love to talk with you about your vacation needs and help plan your stay.  Our office is small and personal, yet we are totally automated for your convenience and can help you in your search of the perfect property.