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becuase its suppose to
What else can I help you with?
Why a stress strain curve usually has two segments?
becuase its suppose to
Can a circle be a parallelogram?
No, a circle can't be a parallelogram. A circle is a curve. A parallelogram is a quadrilateral with two pairs of parallel sides constructed with four line segments. The line segments are straight, and the circle is a continuous curve.
A circle has 1 face but how many vertices?
A circle is a continuous curve. A vertex is the intersection of two (or possibly more) line segments. A circle has no intersecting line segments. It is a curve, and does not have a vertex or vertices. None at all.
Define asymotote and explain the relationship between a hyperbola and its asymptotes?
An asymptote of a curve is a line where the distance of the curve and line approach zero as they tend to infinity (they get closer and closer without ever meeting) If one zooms out of a hyperbola, the straight lines are usually asymptotes as they get closer and closer to a specific point, yet do not reach that point.
Why a stress-strain curve usually has two segments.?
A stress-strain curve typically has two segments because the material first deforms elastically before transitioning to plastic deformation. The initial linear region represents elastic deformation, where the material can return to its original shape after the stress is removed. The second region shows plastic deformation, where the material undergoes permanent deformation due to interatomic sliding or dislocation motion.
How many body segments do arachnids have?
Arachnids have two body segments, the abdomen and......
What does it mean when two segments are congruent?
That the two segments are equal.
What is the number of segments for a spider?
They have two body segments and four leg segments.
Two segments with the same length?
congruent segments
Why is a koch curve infinite?
The Koch curve is considered infinite because it is created through an iterative process that adds infinitely many segments to its structure. Starting with a straight line, each iteration replaces the middle third of each line segment with two segments that form a triangle, increasing the total length without bound. As this process continues indefinitely, the curve's length approaches infinity, while the overall shape remains a finite area. Thus, the Koch curve exemplifies a fractal, showcasing complexity and infinity within a finite space.
Why are there usually two solutions in quadratic equations?
It is easier to understand this if you draw the curve of the equation as a graph. From the graph you will see that the line curves back on itself, usually in a nice parabolic curve. Because it curves back, you find that most values of Y correspond to two different values of X - so there are two solutions.
How do you classify a parallel line?
I classify a parallel line as two line segments that will never intersect if the line kept going. They are perfectly straight and even.
