![]() ![]() ![]() In addition, the proposed method gives more efficient results for multimodal probability density functions. The triangular prism contains 5 faces, 9 edges, and 6 vertices. What is the volume of this triangular prism As we have seen, the volume formula for any prism is V Bh. The results show that the confidence region is found no matter how complex the distribution function. In mathematics, a triangular prism is a three-dimensional solid shape with two identical ends connected by equal parallel lines. In order to show the applicable of the proposed method, four different examples are analyzed. ![]() An approach is enhanced to estimate these confidence regions for probability density functions which are defined as rectangular, polygonal and infinite expanse areas. The formula to find volume is by multiplying the area of the base triangle with the height of the prism. The volume of the prism is the space occupied by the prism. The measurements on this triangular prism are in cm so the volume will be measured in cm 3cm3. Volume of triangular prism 3 × 73 × 7 Volume of triangular prism 2121 4 Write the answer, including the units. Confidence regions estimate not only bivariate unimodal probability functions but also bivariate multimodal probability functions. A triangular prism is a 3D object which has two triangles in the base and 3 lateral sides. Volume of triangular prism Area of triangular cross section x length Volume of triangular prism 3 × 73 × 7 3 Work out the calculation. For a triangular prism, the formula for calculating the volume is as given below. The bisection method is the preferred method in finding the equal density value that reveals the desired confidence coefficient. Volume of a prism Area of the base of the prism x height of the prism or, V Bl where B is the area of the base and l is the height of the prism. The equal density approach is used to demonstrate that confidence regions can be polygonal shapes. In this study, a polygonal approach is suggested to generalize the notion of the confidence region of the univariate probability density function for the bivariate probability density function. ![]()
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