subject is numerical analysis

esi To solve the ordinary differential equation 3^4 + 5y? = sin x, y(0) = 5 dx by Euler's method, you need to rewrite the equation as O dx on = }(sin x5y?) v0)=5 dy = - 5y?, 200)=5 B) dx dy dx - 5y?, y(0)= 5 B) , sin x, y(0)= 5 dx 3 x = -cos x - sx"), 4(0) = -5 Op dx 3 dy = sin x-5y?, y(0)= 5 OE dx Sonraki f(x)=e" - at which interval, f (.x) = 0 has a root? O A) 13 4 OB) to 11 O C) 12 31 OD) 11 21 O E) 12 43 CEC301 f(x) = x 2x 3 find the root of f(x)=0 in the interval [25]. f(x)(x; x,) use False position method; xroot = x, f(x)-f(x) what is the root as second iteration result; X root,2 = ? note: first iteration result; Xroot = 2.6 f(2.6)=-1.44 5. OA) 3.857 B) 2.857 C) 1.857 OD) 0,857 Sonraki D use False position metho what is the root as secon note: first iteration result f (2.6)=-1.44 A) 3.857 B) 2.857 OC) 1.857 D) 0.85%