let f(x)=e^(−nx) ln(2+x^2 ) with n integr natural
1) calculste f^((n)) (x) and f^((n)) (0)
2) developp f at integr serie
3)find ∫_0 ^1 f(x)d and ∫_0 ^∞ f(x)dx
((sin(x))/(√(2sin^2 (x)+cos^2 (x)))) +(1/(√2))=csc(x)(√(2sin^2 (x)+cos^2 (x)))
show that
x={(π/2)+2πn} and x={cos^(−1) ((√3))−π+2πn}
and x={−cos^(−1) ((√3))+2πn}
prove or disprove(with counter−example) that
a) For all two dimensional vectors a,b,c,
a.b = a. c ⇒ b=c.
b) For all positive real numbers a,b.
((a +b)/2) ≥ (√(ab))
The graph of
y = ((a + bx)/((x−1)(x−4)))
has a turning point at P(2,−1). Find the value of a and b
and hence,sketch the curve y = f(x) showing clearly the
turning points, asympototes and intercept(s) with the
axes.