Introduction
Box ceilings are ceiling designs that create a rectangular, square or cuboid shape in the ceiling. They are often used to create a modern and innovative design in residential and commercial interiors. In recent times, the use of box ceiling designs has increased as homeowners and interior designers seek new ways to add flair to their spaces. This article will explore the various types of box ceiling designs and their advantages in modern interiors.
Types of Box Ceilings Designs
Flat Box Ceilings
Flat box ceilings are horizontal boxes that are installed in the ceiling to create depth and interest. They often complement modern interiors, and they are great for those who want to keep things simple yet elegant. Flat box ceilings can come in different shapes and sizes, and they offer the advantage of providing additional lighting options.
Coffered Box Ceilings
Coffered box ceiling designs involve a series of sunken panels or squares, creating a grid-like pattern on the ceiling. They are often made of wood or plaster, and they are ideal for creating a traditional or formal look in your interior. Coffered box ceilings are great for larger rooms, and they add depth and interest to high ceilings.
Angular Box Ceilings
Angular box ceiling creates a modern and edgy look in your interior. They involve the use of slanted walls or angles to create the box effect. They offer an excellent way to infuse a contemporary look into your space. Angular box ceilings provide a unique design that can complement furniture and decorations of different styles.
Advantages of Box Ceiling Designs in Modern Interiors
Adds character and interest
Box ceiling designs add character and interest to residential and commercial interiors. They come in different shapes, sizes, and designs, and they can complement any interior style.
Provides a sense of depth and space
Box ceilings create an illusion of space and depth, making it an excellent design for small rooms. The angled or coffered ceilings create shadows and reflections, making the room appear larger than it is.