MAT1505-03/04 19F Quiz 5 Print Name (Last, First) __________________ , _______________|____Show all work, including mental steps, in a clearly organized way that speaks for itself. Use proper mathematical notation, identifying expressions by their proper symbols (introducing them if necessary), and use EQUAL SIGNS and arrows when appropriate. Always SIMPLIFY expressions. BOX final short answers. LABEL parts of problem. Keep answers EXACT (but give decimal approximations for interpretation when appropriate). Indicate where technology is used and what type (Maple, GC).You may use technology to evaluate the necessary antiderivatives, but you must use the limit definition which allows evaluation of the improper integrals. Check your work by directly evaluating these integrals with technology.1. 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
2.a) 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
b) What percent of this area under the graph out to infinity is represented by the integral from LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYoLUkjbWlHRiQ2JlEieEYnLyUnaXRhbGljR1EldHJ1ZUYnLyUrZXhlY3V0YWJsZUdRJmZhbHNlRicvJSxtYXRodmFyaWFudEdRJ2l0YWxpY0YnLUkjbW9HRiQ2LlEiPUYnRjIvRjZRJ25vcm1hbEYnLyUmZmVuY2VHRjQvJSpzZXBhcmF0b3JHRjQvJSlzdHJldGNoeUdGNC8lKnN5bW1ldHJpY0dGNC8lKGxhcmdlb3BHRjQvJS5tb3ZhYmxlbGltaXRzR0Y0LyUnYWNjZW50R0Y0LyUnbHNwYWNlR1EsMC4yNzc3Nzc4ZW1GJy8lJ3JzcGFjZUdGTi1JI21uR0YkNiVRIjBGJ0YyRjwtRjk2LlEifkYnRjJGPEY+RkBGQkZERkZGSEZKL0ZNUSYwLjBlbUYnL0ZQRllGMkY8 to the location of the maximum value of the integrand? Use calculus to derive the location of the maximum value before proceeding.solution1.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.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 26.4 percent.