2170 Bennett Avenue #108 Active Save Request In-Person Tour Request Virtual Tour
Dallas,TX 75206
$ 3200
2 Beds
3 Baths
1365 SqFt
Key Details
Property Type Townhouse
Sub Type Townhouse
Listing Status Active
Purchase Type For Rent
Square Footage 1,365 sqft
Subdivision Alta Vista
MLS Listing ID 20750303
Style Contemporary/Modern,Split Level
Bedrooms 2
Full Baths 2
Half Baths 1
PAD Fee $1
HOA Y/N None
Year Built 2019
Lot Size 1,951 Sqft
Acres 0.0448
Property Description
Elevate your lifestyle and accept nothing less than luxury at The Collection Townhomes. Discover an urban oasis in Knox Henderson where everything is uniquely designed for your needs, even down to the smallest details. Stay home and appreciate exquisite extra touches such as soaring vaulted ceilings and sleek stainless-steel appliances, or venture out for an exciting get-together in the inviting clubhouse lounge. Whether your perfect day involves a shopping spree on Henderson or a scenic hike at White Rock Lake, the best of the city is practically in your backyard. At our pet-friendly community, the possibilities are endless, so the only limit is your imagination.
Location
State TX
County Dallas
Direction Take 75S, exit Knox-Henderson
Rooms
Dining Room 1
Interior
Heating Electric,Heat Pump
Cooling Ceiling Fan(s),Electric,Heat Pump
Flooring Wood
Appliance Dishwasher,Disposal,Dryer,Gas Cooktop,Gas Oven,Gas Water Heater,Microwave,Refrigerator,Tankless Water Heater,Washer,Water Filter
Heat Source Electric,Heat Pump
Exterior
Garage Spaces 2.0
Carport Spaces 2
Utilities Available City Sewer,City Water,Electricity Available,Individual Gas Meter
Parking Type Garage Single Door
Garage Yes
Building
Story Three Or More
Level or Stories Three Or More
Structure Type Brick,Siding
Schools
Elementary Schools Chavez
Middle Schools Spence
High Schools North Dallas
School District Dallas Isd
Others
Pets Allowed Yes,Call,Cats OK,Dogs OK,Number Limit
Restrictions No Mobile Home,No Smoking,No Sublease
Ownership The Collection
Pets Description Yes,Call,Cats OK,Dogs OK,Number Limit