4514 Abbott Avenue #12 Active Save Request In-Person Tour Request Virtual Tour
Highland Park,TX 75205
$ 8000
4 Beds
4 Baths
2595 SqFt
Key Details
Property Type Condo
Sub Type Condominium
Listing Status Active
Purchase Type For Rent
Square Footage 2,595 sqft
Subdivision Na
MLS Listing ID 20783170
Style Traditional
Bedrooms 4
Full Baths 4
PAD Fee $1
HOA Y/N None
Year Built 2015
Property Description
Gorgeous townhome located on the Katy Trail & in HPISD. This unit has beautiful hardwoods, a ton of windows allowing for plenty of natural light & a large, private courtyard plumbed for gas grill. The spacious chef's kitchen features stainless appliances, including Bertazzoni range, exotic granite counters and opens to the Living & Dining rooms creating a wonderful family & entertaining area. The spacious Master suite boasts a spa-like bath with separate shower & free standing tub. Designer finish out & lighting complete this unique home. Enjoy Knox Travis restaurants, shopping and the Katy Trail!
Location
State TX
County Dallas
Direction West on Knox, Left on Abbott, property is on Left side of street.
Rooms
Dining Room 1
Interior
Interior Features Decorative Lighting,Elevator,Flat Screen Wiring,High Speed Internet Available
Heating Central,Electric
Cooling Central Air,Electric
Fireplaces Number 1
Fireplaces Type Gas Logs
Appliance Commercial Grade Range,Commercial Grade Vent,Dishwasher,Gas Cooktop,Refrigerator,Other
Heat Source Central,Electric
Exterior
Exterior Feature Balcony
Garage Spaces 2.0
Fence None
Utilities Available City Sewer,City Water
Total Parking Spaces 2
Garage Yes
Building
Story Three Or More
Level or Stories Three Or More
Structure Type Brick
Schools
Elementary Schools Armstrong
Middle Schools Highland Park
High Schools Highland Park
School District Highland Park Isd
Others
Pets Allowed Breed Restrictions,Call,Cats OK,Dogs OK,Number Limit,Size Limit
Restrictions No Smoking,No Sublease,No Waterbeds,Pet Restrictions
Ownership See Agent
Pets Description Breed Restrictions,Call,Cats OK,Dogs OK,Number Limit,Size Limit