Solve these { Formulas: * Sº fox) dx - Bom (1 food lim f(x) dx 100 la ܕܐ S -00 dx If limit exists, then the improper integral is said to converge If limit DNE, diverge s dx f(x) dx 80 Š -00 S f(x)dx = a If either one or both of these Lintegrals So If both of integrals Say So Y -00 lim +→-00 Converges ( do) f(x) dx S f(x) dx + Sº -8 blc converge, P= 3 >1 diverges blc p=-2 21 then f(x)dx use this to prove why the problems below Converges or diverges (where a ER) ∞ Sa diverge, then also converges. Use definition to Show S diverges S₂ ½ dx converges s diverges

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Solve Formulas: these ["this debor (( winds) f(x) dx M lim f(x) dx [*][*] f(x) dx lim = -8 00 S fex)dx -00 b If limit exists, then the improper integral is said to converge. If limit DNE, diverge. a If both of integrals Sa ·00 -8 t f(x) dx f(x) dx + 8 S f(x) dx a If either one or both of these 2 integrals Sco #{{I}]}] * dx Converges blc p= 3 >1 * S dx diverges blc p=-2 3 S converge, then & 5⁰⁰ 00 00 use this to prove why the problems below Converges or diverges (where a ER) diverge, then also converges. So diverges -00 00 Use definition to show S₂ = dx converges 3 S5₂2 diverges