Graph the function y = x4 -1Ox2 = x2 (x2 -10) by identifying the domain and any symmetries, nding the derivatives y' and y\4x- + 11x- 3 Graph the function y = by identifying the domain and X - 9 any symmetries, finding the derivatives y' and y", finding the critical points and identifying the function's behavior at each one, finding where the curve is increasing and where it is decreasing, finding the points of inflection, determining the concavity of the curve, identifying any asymptotes, and plotting any key points such as intercepts, critical points, and inflection points. Then find coordinates of absolute extreme points, if any.12 Graph the function y = by identifying the domain and 2 - 4 X any symmetries, finding the derivatives y' and y", finding the critical points and identifying the function's behavior at each one, finding where the curve is increasing and where it is decreasing, finding the points of inflection, determining the concavity of the curve, identifying any asymptotes, and plotting any key points such as intercepts, critical points, and inflection points. Then find coordinates of absolute extreme points, if any.2 + 4x + 8 Graph the function y = x + 2 by identifying the domain and any symmetries, finding the derivatives y' and y", finding the critical points and identifying the function's behavior at each one, finding where the curve is increasing and where it is decreasing, finding the points of inflection, determining the concavity of the curve, identifying any asymptotes, and plotting any key points such as intercepts, critical points, and inflection points. Then find coordinates of absolute extreme points, if any.Graph the function y =12x +12 sin (x), 0 S x s 21:, by identifying the domain and any symmetries, nding the derivatives y\" and y\Graph the function y =17x - 17 sin ()0, O s x s 21:, by identifying the domain and any symmetries, nding the derivatives y' and y\Graph the function y = 713x + 14 cos (x), 0Sx 2x by identifying the domain and any symmetries, finding the derivatives y' and y", finding the critical points, finding where the curve is increasing and where it is decreasing, finding the points of inflection and concavity, identifying any asymptotes, and plotting any key points such as intercepts, critical points, and inflection points. Then find coordinates of absolute extreme points, if any