This beautiful spacious End Unit 1585 sqft freehold Townhome with 3 Bedrooms and 2.5 Baths provides ample room for comfortable living & entertaining. Located in a premium area in the Westminster Woods neighbourhood in the south end of Guelph. You will love the open concept main floor with a large living and dining room as well as well oriented kitchen with stainless steel appliances. Three spacious bedrooms upstairs with a master ensuite bathroom as well as another 4- piece bathroom for the other bedrooms. The finished recreation room downstairs is a great place for relaxing or entertaining. Beautiful fenced rear yard with access door and mature trees at the back for privacy making it ideal spot for entertaining friends and family. Additional bonus is California window shutters throughout the house and zone heating and cooling system available. The prime location of the house has something to offer for everyone, park and Westminster woods trail for nature lovers, short drive to 401 for commuters, and for families with kids well rates Westminster Woods Public School is just walking distance. Don't miss out, book your showing today!
Property Type:
Residential
Property SubType:
Row/Townhouse
Year built:
2008
(Age: 16)
Listing General Location:
18 - Pineridge/Westminster Woods, City of Guelph
Bedrooms:
3
Bathrooms:
3.0
(Full:2/Half:1)
Lot Details:
109.73 x 26.92
Lot Depth:
109'8¾"33.446 m
Lot Frontage:
26'11"8.205 m
Frontage Type:
East
Kitchens:
1
Home Style:
Two Story
County Or Parish:
Wellington
Property Attached:
Attached
Features:
Attached Garage: Yes, Crops Included: No, Garage: Yes, Common Elements Fee: Yes, New Construction: No
Data was last updated September 9, 2024 at 09:50 PM (UTC)
Area Statistics
Listings on market:
36
Avg list price:
$872,450
Min list price:
$445,800
Max list price:
$1,699,990
Avg days on market:
34
Min days on market:
0
Max days on market:
87
Avg price per sq.ft.:
$515.95
These statistics are generated based on the current listing's property type
and located in
18 - Pineridge/Westminster Woods. Average values are
derived using median calculations.