Geometry problems Use a table of
46. The graphs of
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- Reduction formulas Use the reduction formulas in a table of integrals to evaluate the following integrals. ∫p2 e-3p dparrow_forward1A Define the followings: 1. How to determine the order of the difference equation? Explain with examples. 2. How to determine the degree of the difference equation? Give examples. 3. What is the difference between homogenous and non-homogenous difference equation? Given some examples. 4. Explain the rules of choosing the trial solution for particular integral in difference equationarrow_forwardGeometry problems Use a table of integrals to solve the following problems.arrow_forward
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- \int_1^(e^(2)) e^(-x)x^(-1)dx-\int_1^(e^(2)) e^(-x)\ln xdx= (a)e^(-e^(2)) (b)2+e^(-e^(2)) (c)2e^(-e^(2)) (d)1-e^(-e^(2)) (e)none of thesearrow_forwardTake note: ANSWER IN A CLEAN SHEET OF BOND PAPER (HANDWRITTEN). SHOW COMPLETE AND CORRECT SOLUTIONS IN ANSWERING. BOX THE final answer.. PROVIDE FIVE (5) DEFINITE INTEGRAL PROBLEMS AND SOLVE THEM NUMERICALLY USING SIMPSON RULE. USE (a) n = 4, and (b) n = 8. CREATE A TABLE THAT WILL SUMMARIZE THE RESULTS OF YOUR CALCULATIONS AND COMPARE THEM WITH THE RESULT WHEN SOLVED ANALYTICALLY.arrow_forward*definite integral* (b=10) (a=0) (10e^(-x))((x^3)+2(x^2)-3x+1) dxarrow_forward
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