Given. 17 cos(x²) dx Do the following. (a) Find the approximations T and Mg for the given integral. (Round your answer to six decimal places.) Tg = Ma (b) Estimate the errors in the approximations Tg and M& in part (a). (Use the fact that the range of the sine and cosine functions is bounded by ±1 to estimate the maximum error. Round your answer to seven decimal places.) |ET| s IEMI S (c) How large do we have to choose n so that the approximations T and M₁ to the integral are accurate to within 0.0001? (Use the fact that the range of the sine and cosine functions is bounded by ±1 to estimate the maximum error.) nz nz for T for M

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Given. [² 17 cos(x²) dx Do the following. (a) Find the approximations Tg and Mg for the given integral. (Round your answer to six decimal places.) T8 M8 (b) Estimate the errors in the approximations Tg and M8 in part (a). (Use the fact that the range of the sine and cosine functions is bounded by ±1 to estimate the maximum error. Round your answer to seven decimal places.) |ET| ≤ IEMI ≤ (c) How large do we have to choose n so that the approximations T and MÃ to the integral are accurate to within 0.0001? (Use the fact that the range of the sine and cosine functions is bounded by ±1 to estimate the maximum error.) nz n> for T for Mn