Найти производную функций: 1) 2x^6y^3-ln7y*ln8x=0 2) y=(5x^2+6)^arctg8x

1) 2x⁶y³ - ln7y*ln8x=0;

(2x⁶y³ - ln7y*ln8x)'=0;

12x⁵y³ + 2x⁶·3y²·y' - (1/7y)·7y'·ln8x - ln7y·(1/8x)·8 = 0;

12x⁵y³ + 6x⁶y²·y' - (y'ln8x)/y - ln7y·(1/x) = 0;

12x⁵y³ + y'(6x⁶y² - (ln8x)/y) - ln7y·(1/x) = 0;

y'(6x⁶y² - (ln8x)/y) = ln7y/x - 12x⁵y³;

y' = (ln7y/x - 12x⁵y³)/(6x⁶y² - (ln8x)/y).

2) y=(5x²+6)^arctg8x;

lny = arctg8x·ln(5x²+6);

(lny)' = (arctg8x·ln(5x²+6))';

y'/y = (8/(1+64x²))·ln(5x²+6) + (10x·arctg8x)/(5x²+6);

y' = y((8/(1+64x²))·ln(5x²+6) + (10x·arctg8x)/(5x²+6));

y' = ((5x^2+6)^arctg8x)·((8/(1+64x²))·ln(5x²+6) + (10x·arctg8x)/(5x²+6));