For a chemical reaction `aAtoB,log[-(d[A])/(dt)]=log[(d[B])/(dt)]+0.3` then find the approximate ratio and of a and b

For 3AtoxB,(d[B])/(dt) is found to be 2/3rd of (d[A])/(dt) ,. Then the value of x is

3A to 2B , rate of reaction +(d[B])/(dt) is equal to

The rate of reaction A+2Bto Products is given by -(d[A])/(dt)=k[A][B]^(2) .If B is present in large excess, the order of reaction is

Rate of cooling (d theta)/(dt) depends upon

(d)/(dx) {log ((x )/(e ^(tanx)))}=

For the reaction 2HItoH_(2)+I_(2) the expression -1/2(d[HI])/(dt) represents

The instantaneous rate of an elementary chamical reactkon aA+bBhArr cC+dD can be given by rate =K_(f)[A]^(a)[B]^(b)-K_(b)[C]^(c)[D]^(d) where K_(f) and K_(b) are rate constants for forward and backward reactions respectively for the reversible reaction. If the reaction is an irreversible one, the rate is expressed as, rate =K[A]^(a)[B]^(b) where K is rate contant for the given irreversible rate of disappearance of A is a/b times the rate of disappearance of B. The variation of rate constant K with temperature is expressed in terms of Arrhenius equation: K=Ae^(-E_(a)//RT) whereas the ratio (K_(f))/(K_(b)) is expressed in terms of van't Hoff isochore: (K_(f))/(K_(b))=Ae^(-DeltaH//RT) , where E_(a) and DeltaH are energy of activation and heat of reaction respectively. For an elementary reaction aAto product, the graph plotted log([-d[A]])/(dt) vs log[A]_(t) gives a straight line with intercept equal to 0.6 and showing an angle of 45^(@) then