Behaviour being used: Adaptive mode
Minimum fraction: 0
Question summary: Fie funcţiile : [straight f left parenthesis straight x right parenthesis equals fraction numerator square root of straight x squared plus # straight n end root over denominator straight x squared plus # straight p end fraction straight g left parenthesis straight x right parenthesis equals fraction numerator straight x plus left parenthesis # straight m right parenthesis over denominator square root of straight x squared plus # straight n end root end fraction straight h left parenthesis straight x right parenthesis equals fraction numerator straight x squared plus # straight p space straight x plus # straight n space over denominator square root of straight x squared plus # r end root end fraction] Să se selecteze răspunsul corespunzător: Derivata lui f: {(-x^3-8·x)/((x^4+4·x^2+4)·(x^2+5)^(1/2)); (x^3+27·x+32)/((x^2+16)·(x^2+16)^(1/2)); (4·x+5)/((x^2+5)·(x^2+5)^(1/2))} Derivata lui g: {(x^3+27·x+32)/((x^2+16)·(x^2+16)^(1/2)); (4·x+5)/((x^2+5)·(x^2+5)^(1/2)); (-x^3-8·x)/((x^4+4·x^2+4)·(x^2+5)^(1/2))} Derivata lui h: {(4·x+5)/((x^2+5)·(x^2+5)^(1/2)); (-x^3-8·x)/((x^4+4·x^2+4)·(x^2+5)^(1/2)); (x^3+27·x+32)/((x^2+16)·(x^2+16)^(1/2))}
Right answer summary: part 1: (-x^3-8·x)/((x^4+4·x^2+4)·(x^2+5)^(1/2)); part 2: (4·x+5)/((x^2+5)·(x^2+5)^(1/2)); part 3: (4·x+5)/((x^2+5)·(x^2+5)^(1/2))
Question state: todo