can you plsase send me the answer as soon as possible
GENERAL GUIDELINES FOR ALL QUESTIONS The symbol of approximation before an input field means that the corresponding numerical answer must be founded to a lik-digit floating point number (as specified in the corresponding question); floating point numbers must be entered either as usual decimal numbers, or in the gentation, that is in the form 19.did...den 0.0142 dken or in the form td.d.chend.2 tkan where studiare digits and 26: Zosis an integer number, notice the absence of a space before and after the symbol off a space or any other relevant symbol will be present before or after the symbol se your answer will either downgraded, or ignored). accordingly, please DO NOT enter Moating point numbers in the form +0.dada..da 10^n,0.012 dk 10 or in the form tdi.da...ch 10.11.02. dk 10" all such inputs will be ignored the following convention is to be applied to determine whether a given thoating point number must be entered as a usual decimal number co must be entered as a sua decimal number if and only if 10--
. and any non ASCII symbols, e., the symbols ,,V, 3.0, 6 ,,V,00,-. Inputs in which any of these symbols is present will be ignored (Taylor Polynomials). Consider the eighth Taylor polynomial T(x)=1+x+x22!+x33!+ x44!+xs5!+x66!+x77!+x88!T(x)=1+x+x22!+x33!*x44.*x55/4x66.+ X771+x88! of the exponential function f(x)=exf(x)=ex about zero. Your task in this question is to obtain two approximations Yay and y--y of the number y=e-0.811 y-e-0.811, and then to determine which of the approximations is better in terms of the corresponding relative error and number of significant digits. All calculations, unless otherwise instructed are to be carried out in the FPA7.7. 0 (a) To obtain the first approximation Y.ye of y.x evaluate of the Taylor polynomial T(x)T(x) at the point x=-0.811x=-0.811 in the FPA7,7. y.=T(-0.811) *T(-0.811) and then enter your result, a 77-digit floating point number, in the input field below. yo=y+ Answer (b) Find the relative error in the approximation of yy by Yay-of you have been using a scientific calculator, exit the (Sci 2 (Scl 7) mode beforehand to get a more accurate result), and then round the result to a 77-digit floating point number RE(yxy. ERE(y=y=)= Answer (e) Find the number of significant digits in the approximation of yy by Yay: SD(yy:) SD(yy)+ Answer CH) To obtain the second approximation y..y of y. y=1/T(0.811)x=1/T(0.811) work in the FPA77 first to evaluate the Taylor polynomial T[x]T(x) at the point x=0.811=0.811, and then invert your result, enter your answer in the input field that follows (here and everywhere below in this part when entering your numerical answers, please abide the instructions given in part): yu.sy. Answer Accessibility Unavailable Star wi Font 19 Save 16 Space Heading Heading 2 Paragraph Styles that is temporarily stored on your computer (b) Find the relative error in the approximation of yy by y..y**: RE(yzy..) RE(y=y=+)= Answer (c) Find the number of significant digits in the approximation of yy. by y..yes SD(yzy:-) SD(y=y=)= Answer (ii) (a) Which of the approximations is better in terms of the corresponding relative error? YAYAY=Y YEYYEY** (b) Which of the approximations is better in terms of the corresponding number of significant digits? yzy:YEY YEY GENERAL GUIDELINES FOR ALL QUESTIONS The symbol of approximation before an input field means that the corresponding numerical answer must be founded to a lik-digit floating point number (as specified in the corresponding question); floating point numbers must be entered either as usual decimal numbers, or in the gentation, that is in the form 19.did...den 0.0142 dken or in the form td.d.chend.2 tkan where studiare digits and 26: Zosis an integer number, notice the absence of a space before and after the symbol off a space or any other relevant symbol will be present before or after the symbol se your answer will either downgraded, or ignored). accordingly, please DO NOT enter Moating point numbers in the form +0.dada..da 10^n,0.012 dk 10 or in the form tdi.da...ch 10.11.02. dk 10" all such inputs will be ignored the following convention is to be applied to determine whether a given thoating point number must be entered as a usual decimal number co must be entered as a sua decimal number if and only if 10--. and any non ASCII symbols, e., the symbols ,,V, 3.0, 6 ,,V,00,-. Inputs in which any of these symbols is present will be ignored (Taylor Polynomials). Consider the eighth Taylor polynomial T(x)=1+x+x22!+x33!+ x44!+xs5!+x66!+x77!+x88!T(x)=1+x+x22!+x33!*x44.*x55/4x66.+ X771+x88! of the exponential function f(x)=exf(x)=ex about zero. Your task in this question is to obtain two approximations Yay and y--y of the number y=e-0.811 y-e-0.811, and then to determine which of the approximations is better in terms of the corresponding relative error and number of significant digits. All calculations, unless otherwise instructed are to be carried out in the FPA7.7. 0 (a) To obtain the first approximation Y.ye of y.x evaluate of the Taylor polynomial T(x)T(x) at the point x=-0.811x=-0.811 in the FPA7,7. y.=T(-0.811) *T(-0.811) and then enter your result, a 77-digit floating point number, in the input field below. yo=y+ Answer (b) Find the relative error in the approximation of yy by Yay-of you have been using a scientific calculator, exit the (Sci 2 (Scl 7) mode beforehand to get a more accurate result), and then round the result to a 77-digit floating point number RE(yxy. ERE(y=y=)= Answer (e) Find the number of significant digits in the approximation of yy by Yay: SD(yy:) SD(yy)+ Answer CH) To obtain the second approximation y..y of y. y=1/T(0.811)x=1/T(0.811) work in the FPA77 first to evaluate the Taylor polynomial T[x]T(x) at the point x=0.811=0.811, and then invert your result, enter your answer in the input field that follows (here and everywhere below in this part when entering your numerical answers, please abide the instructions given in part): yu.sy. Answer Accessibility Unavailable Star wi Font 19 Save 16 Space Heading Heading 2 Paragraph Styles that is temporarily stored on your computer (b) Find the relative error in the approximation of yy by y..y**: RE(yzy..) RE(y=y=+)= Answer (c) Find the number of significant digits in the approximation of yy. by y..yes SD(yzy:-) SD(y=y=)= Answer (ii) (a) Which of the approximations is better in terms of the corresponding relative error? YAYAY=Y YEYYEY** (b) Which of the approximations is better in terms of the corresponding number of significant digits? yzy:YEY YEY
