9 Karat Condo

Unit ID: PA-4553
฿ 15,000 Per Month
Condo - Bang Lamung, Pattaya

Property Details

  • Bedrooms
    BEDROOMS
    2
  • Bathrooms
    BATHROOMS
    1
  • Sleeps
    SLEEPS
    4
  • Pets
    PETS
    Not Allowed
  • Smoking
    SMOKING
    Not Allowed
  • Unit Area
    UNIT AREA (SqM)
    64
  • FLOOR
    14

2 bed condo for sale and rent in Bang Lamung, Pattaya

The property PA-4553 is a 64 square meter condo with 2 bedrooms and 1 bathroom. You can rent this condo long term for ฿15,000 per month. It is part of the 9 Karat Condo project in Bang Lamung, Pattaya and was completed in 1992 Aug. The condo is also available for sale for a base price of ฿2,100,000 (฿32,812/Sq.M).

Features

  • Balcony

Basic Information

  • Property Type: Condo
  • Location: Bang Lamung, Pattaya, Thailand
  • Build: Completed (1992 Aug)
  • Sale Status: For Sale and Rent by Private Owner
  • View(s): City, Sea
  • Furniture: Fully Furnished
  • Number of Units in Project: 450
  • Number of Floors in Building: 0
  • Distance to Beach: 1 Km
Contact us

Project Features

  • Hotel ManagedHotel Managed
  • On Site RestaurantOn Site Restaurant
  • Communal PoolCommunal Pool
  • JacuzziJacuzzi
  • Communal GymCommunal Gym
  • BarBar
  • ClubhouseClubhouse
  • 24H Security24 H Security
  • Reception Lobby AreaReception Lobby Area
  • CCTVC C T V
  • Shuttle Bus To BeachShuttle Bus To Beach
  • Kids ClubKids Club
  • Car ParkingCar Parking
  • SpaSpa
  • Steam RoomSteam Room
  • Direct Beach AccessDirect Beach Access
  • SaunaSauna
  • Tennis CourtTennis Court

Available Units at 9 Karat Condo

2 Beds Condo for rent at 9 Karat Condo
฿ 15,000/mo
2
1
64 SqM
View Details
2 Beds Condo for sale at 9 Karat Condo
฿ 2,100,000
2
1
64 SqM
View Details

Market Comparison

AVERAGE PRICES IN THAILAND PER SQM

The monthly price of this 2 bed condo for rent is ฿15,000. The average price per month for 2 bed condos in Bang Lamung is ฿33,786, which is 19% below the average monthly price of 2 bed condos for rent in Pattaya which is ฿41,675.

Location Matrix