Is a Truss Stable if It Satisfies a Specific Condition?

Is it true that a truss is considered the most stable if it satisfies the condition n=2j−3?

True

False

The statement "If a plane truss satisfies the following condition then that truss is considered the most stable truss or structure. n = 2j - 3, where n is the number of members and j is the number of joints" is False.

The equation n = 2j - 3 represents the equation for a statically determinate truss, where the number of members (n) equals twice the number of joints (2j) minus 3.

However, being statically determinate does not necessarily mean that a truss is the most stable.

The stability of a truss or structure depends on various factors including its geometric arrangement, support conditions, load distribution, and material properties. While statically determinate trusses can be stable, stability is not solely determined by the equation n = 2j - 3.

Other factors must be considered in evaluating the stability and structural integrity of a truss or structure.

It is essential to assess the overall design, materials used, and external influences on the structure to determine its stability and safety.

Remember, structural stability is a complex interplay of multiple factors, not just a single equation.