Hot Springs, AR · Garland County
Flat-rate interior painting. No estimate visit.
No waiting for a callback. Book your job today.
✓ AR Licensed #0473160926
✓ Trusted and Reliable Choice
✓ Serving Hot Springs & Garland County
Instant Quote
What's your project?
Pre-filled from your link adjust anytime.
Turnaround preference
Paint supply
Ceiling & wall type
Min 10 ft · +5% per foot above 9 ft (max 19 ft)
We multiply your floor square footage by our per-sqft rate. Floor area is the measurement you already know no tape measure visit needed. Ceiling and paint modifiers apply on top. A $400 minimum applies to all jobs.
Includes interior walls, trim, doors & ceilings. Exterior not included.
The process
Enter your square footage
Get an instant price. No estimate visit, no waiting for a callback. Use your floor area the measurement you already know.
Submit your start date
Vetra reaches out within 4 hours to confirm. We work around your schedule and your tenant's move-out.
We show up and paint
Licensed, insured, flat-rate. What you saw in the calculator is what you pay. Get your unit back on the market faster.
Transparent pricing
We use your floor square footage the measurement you already have. No tape measure visit required.
Standard turnaround
~200 sq ft/day
$1.80/sq ft
Fast turnaround
~400 sq ft/day higher daily output
$2.30/sq ft
Vetra supplies quality paint
We supply, mix, and haul you don't lift a box
+20%
Vaulted ceilings
Applies if any part of the home has vaulted ceilings
+10%
Minimum job price
Applies to any booking regardless of square footage
$400
Walls taller than 9 ft
Per extra foot above 9 ft (max +50%)
+5%/ft
Includes interior walls, trim, doors, and ceilings. Exterior painting not included mention it in your booking notes and we'll discuss.
Where we work
We serve Hot Springs, Malvern, Benton, Arkadelphia, and surrounding Garland County. Not sure if we cover your area? (501) 521-6758
Book your job
Fill out your details below and we'll reach out within 2 business hours to confirm your start date.
Your estimate
$