Norm's Plumbing Corp in Saint Clair Shores, MI, 48080 - Plumbers and Plumbing Contractors
Business Name : Norm's Plumbing Corp
Address : 20301 Maxine St
Phone Number : (586) 776-2558
Website : Visit Here
Category : Plumbers and Plumbing Contractors
Year founder : 2000
Location type : Single Location
Annual Revenue (In Thousands) : $500.000 to $999.999
SIC : 1711
NAICS : 2382202
Industry : Construction
Since the first Norm's Plumbing Corp was founded in 2000, the company remains committed to the core values that are founded on doing quality work at reasonable prices. Over fifty years later the original Norm's Plumbing Corp company still serves Saint Clair Shores, MI homes and businesses. It's still privately owned and operated with strong ties to the community that made it all possible.
That local connection has never gone away on us. Today Norm's Plumbing Corp is a large group of independently-owned and operated plumbing companies united by a shared set of values and a common belief in providing the best customer service. While our network is extensive, with hundreds of locations across the United States, each business is ingrained and committed to the communities that they work in. Because they're our communities too. We've learned that providing exceptional customer service is only possible when you care deeply about your customers.
Plumbing emergencies can be a real problem. We don't want to have to deal with a rude customer service representative or repairman. We provide a friendly voice, courteous calls, and a simple process. We make your emergency a priority for us. We will schedule services as soon as we can to resolve your problem.
Our plumbers operate in the same way--they treat your house with respect and consideration. We wipe our feet on mats, wear shoes covers before entering your home We'll provide you with a fair analysis of your plumbing problem and the amount it's going to cost to fix it. Our charges are fixed-price and upfront, which means you won't have to fret about inflating prices as the work gets more complicated.