⇢Brainly mods & stars help!!
Q. the rate of certain reaction depends on concentration according to the equation 
= [tex]\frac{k¹c}{1+k²c}
• what will be the order of reaction when Concentration 'c' is very-very high
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Answers
Answer:
We know that, given two vectors say x and y, their vector product denoted by x×y is a vector that is perpendicular to the plane containing them.
We know that, given two vectors say x and y, their vector product denoted by x×y is a vector that is perpendicular to the plane containing them.The given points, A(3,−1,2),B(1,−1,−3) and C(4,−3,1) lie in the plane ABC.
We know that, given two vectors say x and y, their vector product denoted by x×y is a vector that is perpendicular to the plane containing them.The given points, A(3,−1,2),B(1,−1,−3) and C(4,−3,1) lie in the plane ABC.Accordingly, the vectors AB and ACϵ the plane ABC.
We know that, given two vectors say x and y, their vector product denoted by x×y is a vector that is perpendicular to the plane containing them.The given points, A(3,−1,2),B(1,−1,−3) and C(4,−3,1) lie in the plane ABC.Accordingly, the vectors AB and ACϵ the plane ABC.Hence, AB×AC is perpendicular to the plane ABC.
Answer:
We know that, given two vectors say x and y, their vector product denoted by xxy is a vector that is perpendicular to the plane containing them.
We know that, given two vectors say x and y, their vector product denoted by xxy is a vector that is perpendicular to the plane containing them.The given points, A(3,-1,2),B(1,-1,-3) and C(4,-3,1) lie in the plane ABC.
We know that, given two vectors say x and y, their vector product denoted by xxy is a vector that is perpendicular to the plane containing them.The given points, A(3,-1,2),B(1,-1,-3) and C(4,-3,1) lie in the plane ABC.Accordingly, the vectors AB and ACE the plane ABC.
We know that, given two vectors say x and y, their vector product denoted by xxy is a vector that is perpendicular to the plane containing them.The given points, A(3,-1,2),B(1,-1,-3) and C(4,-3,1) lie in the plane ABC.Accordingly, the vectors AB and ACE the plane ABC.Hence, ABXAC is perpendicular to the plane ABC.