Question
For the chemical reaction , the rate of formation of is 0.04 mole lit-1sec-1. Determine the rate of disappearance of
The correct answer is:
Related Questions to study
If a homogenous catalytic reaction follows three alternative paths and then which of the following indicates the relative ease with which the reaction moves?
If a homogenous catalytic reaction follows three alternative paths and then which of the following indicates the relative ease with which the reaction moves?
For the reaction (g), at 900 K. following data are observed.
Find out the rate law and order of reaction -
For the reaction (g), at 900 K. following data are observed.
Find out the rate law and order of reaction -
During the transformation of the number of emitted is
During the transformation of the number of emitted is
For which positive integers n is the ratio, an integer?
an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements. the variable n is generalized using an AP as well.
For which positive integers n is the ratio, an integer?
an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements. the variable n is generalized using an AP as well.
A particle begins at the origin and moves successively in the following manner as shown, 1 unit to the right, unit up, unit to the right, unit down, unit to the right etc. The length of each move is half the length of the previous move and movement continues in the ‘zigzag’ manner indefinitely. The co-ordinates of the point to which the ‘zigzag’ converges is
the problem states that the particle’s movement follows a geometric progression with the first term being 1 and the ratio being ½ and the particle moves infinitely.
The ratio in the x direction is ¼ . The ratio in the y direction is -1/4
A particle begins at the origin and moves successively in the following manner as shown, 1 unit to the right, unit up, unit to the right, unit down, unit to the right etc. The length of each move is half the length of the previous move and movement continues in the ‘zigzag’ manner indefinitely. The co-ordinates of the point to which the ‘zigzag’ converges is
the problem states that the particle’s movement follows a geometric progression with the first term being 1 and the ratio being ½ and the particle moves infinitely.
The ratio in the x direction is ¼ . The ratio in the y direction is -1/4
If a1, a2, a3, ........., an are positive real numbers whose product is a fixed number c, then the minimum value of a1 + a2 + a3 + .... + an – 1 + 2an is
the Am- Gm relation is a handy tool for solving sequence related problems. it is applicable to any sequence of numbers.
If a1, a2, a3, ........., an are positive real numbers whose product is a fixed number c, then the minimum value of a1 + a2 + a3 + .... + an – 1 + 2an is
the Am- Gm relation is a handy tool for solving sequence related problems. it is applicable to any sequence of numbers.
Let and are two arithmetic sequences such that and then the value of is
an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements
Let and are two arithmetic sequences such that and then the value of is
an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements
If a, b and c are three consecutive positive terms of a G.P. then the graph of y = ax2 + bx + c is
Nature of graph of a quadratic equation is given by its discriminant.
Here, a = a, b= ar, c = ar2 , where r is the common ratio of the GP
Given, a,b,c>0
If a, b and c are three consecutive positive terms of a G.P. then the graph of y = ax2 + bx + c is
Nature of graph of a quadratic equation is given by its discriminant.
Here, a = a, b= ar, c = ar2 , where r is the common ratio of the GP
Given, a,b,c>0
If ln (a + c) , ln (c – a), ln (a – 2b + c) are in A.P., then :
an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements
An = A1+(n-1)x d
A2= A1 + d
A3 = A1 + 2d
A3 = A2+d
A3-A2=A2-A1
If ln (a + c) , ln (c – a), ln (a – 2b + c) are in A.P., then :
an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements
An = A1+(n-1)x d
A2= A1 + d
A3 = A1 + 2d
A3 = A2+d
A3-A2=A2-A1