20306 Paseo Los Arcos new Save Request In-Person Tour Request Virtual Tour
Porter Ranch,CA 91311
$ 4800
3 Beds
3 Baths
1590 SqFt
Key Details
Property Type Townhouse
Sub Type Townhouse
Listing Status Active
Purchase Type For Rent
Square Footage 1,590 sqft
MLS Listing ID SR25174756
Bedrooms 3
Full Baths 3
Year Built 2014
Lot Size 0.282 Acres
Property Sub-Type Townhouse
Property Description
The perfect townhome located in the prestigious guard gated "Aldea at Porter Ranch" community. Never been rented with new carpet just installed. One full bedroom and full bath downstairs, ready for the in-laws. High end stone flooring in Kitchen and family room. Open light and bright family room and kitchen. The kitchen has granite countertops, large island big enough to sit at, every appliance the cook ever wanted, including stainless refrigerator. Upstairs the master suite includes a walk-in closet. Also the laundry room upstairs includes washer and dryer. Large back/side enclosed side patio. The double car garage is attached and the tankless water heater is there. The common area is close by and is one of the biggest and best in Porter Ranch with multiple pools and more. Just next door is the almost new "Vineyards Shopping Center" with - Whole Foods, multiple restaurants including the famous Lure Fish House, Nordstroms, See's Candy and a Movie Theater. Porter Ranch is also home to a very large YMCA and the Porter Valley Country Club.
Location
State CA
County Los Angeles
Area Pora - Porter Ranch
Zoning LAC4
Interior
Heating Central
Cooling Central Air
Fireplaces Type None
Laundry Upper Level
Exterior
Parking Features Direct Access,Door-Single,Garage,Garage Door Opener,Garage Faces Rear
Garage Spaces 2.0
Garage Description 2.0
Pool Association,Community
Community Features Street Lights,Sidewalks,Gated,Pool
View Y/N Yes
View Mountain(s)
Building
Dwelling Type House
Story 2
Sewer Unknown
Water Public
New Construction No
Schools
High Schools Chatsworth
School District Los Angeles Unified
Others
Pets Allowed Breed Restrictions,Number Limit