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the bevel angle and the miter angle
A compound cut consists of two angles, the bevel angle and the miter angle. The bevel angle (or blade tilt) is the tilt of the saw blade from vertical on the saw table. This means that a normal square cut has a bevel of 0°.

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A compound cut consists of two angles, the bevel angle and the miter angle. The bevel angle (or blade tilt) is the tilt of the saw blade from vertical on the saw table. This means that a normal square cut has a bevel of 0°.

Know more about "COMPOUND ANGLES"
A compound cut consists of two angles, the bevel angle and the miter angle. The bevel angle (or blade tilt) is the tilt of the saw blade from vertical on the saw table. This means that a normal square cut has a bevel of 0°. 
Want to know more about "INTEGRATIONS"
Integration is the act of bringing together smaller components into a single system that functions as one. In an IT context, integration refers to the end result of a process that aims to stitch together different, often disparate, subsystems so that the data contained in each becomes part of a larger, more comprehensive system that, ideally, quickly and easily shares data when needed. This often requires that companies build a customized architecture or structure of applications to combine new or existing hardware, software and other communications. 
Now You can know more about "PARTIAL FRACTIONS"
When a proper rational expression is decomposed into a sum of two or more rational expressions, it is known as Partial Fractions. More About Partial Fractions It is used in integrating rational fractions in calculus and finding the inverse Laplace transform. In partial fractions the degree of numerator is less than the degree of the denominator. Examples of Partial Fractions The rational function Examples of Partial Fractions can be decomposed into partial fractions in the following way: First decompose the fraction into linear factors as Examples of Partial Fractions = Examples of Partial Fractions On simplification, x  4 = A(x + 4) + B(x) Now, by comparing the coefficients of like terms on both sides, we get, A + B = 1, 4A =  4. On solving the equations, we get, A =  1, B = 2. By substituting the values of A and B, we get, Examples of Partial Fractions = Examples of Partial Fractions.