Laura is building rectangular boxes of different sizes. The length of ..
Laura is building rectangular boxes of different sizes. The length of the box ' y ' is 8 times its width ' x '. If the widths she is using are 5 cm, 7 cm and 9 cm, then choose a rule for the relation between the length and the width and determine if this relation is a function. ..
Write a rule for the linear function from the table [Using f(x) = mx +..
Write a rule for the linear function from the table [Using f( x ) = mx + b , where m = (difference between the f( x )-values)/ (difference between the x -values) and b is the value of f( x ) when x = 0.] => f ( x ) = 4 x -1 or f ( x ) = 2 x + 1 or f ( x ) = x + 1 or None of the ..
Find a rule for the function (f - g)(x), if f(x) = xx2 - 36,..
Find a rule for the function ( f - g )( x ), if f ( x ) = x x 2 - 3 6 , g ( x ) = 6 x 2 - 3 6 . => ( f - g )( x ) = - 1 x + 6 or ( f - g )( x ) = 1..
Find the rule for the function (f÷g)(x), if f(x) = x +&nbs..
Find the rule for the function ( f ÷ g )( x ), if f ( x ) = x + 4 x 4 , g ( x ) = 3 ( x + 4 ) x 6 . => ( f ÷ g )( x ) = x 1 3 or ( f ÷ g )( x )..
Function
Function - We consider two sets A and B. We form the Cartesian Product, we form relations. From all the relations, we can select a few which satisfy the rule that each element of the set A is related to only one element of the set B. When a relation satisfies this rule..
Product Rule for Differentiation
Product Rule for Differentiation - Let y = u. v, where both u and v are differentiable functions of x.Let y = u. v, where both u and v are differentiable functions of ..
Product Rule for Differentiation - Let y = u. v, where both u and v are differentiable functions of x.Let y = u. v, where both u and v are differentiable functions of ..Product Rule for Differentiation
'Derivative of the product of two functions = first function x derivative of second function + second function x derivative of first function..
Product Rule for Differentiation
Let y = u. v, where both u and v are differentiable functions of x.Let y = u. v, where both u and v are differentiable functions of x. or (u.v)' = u.v' + v..
Let y = u. v, where both u and v are differentiable functions of x.Let y = u. v, where both u and v are differentiable functions of x. or (u.v)' = u.v' + v..Working Rules to find derivatives
Derivability implies continuity Derivative of a constant function is zero. ..
Derivability implies continuity Derivative of a constant function is zero. ..Derivative of a Function of a Function
Derivative of a Function of a Function - So far, we know how to differentiate functions like sin x and x 3 - 5. But how do we differentiate a function of a function? That is how can we differentiate sin (x 3 - 5)?So far, we know how to differentiate..
Derivative of a Function of a Function - So far, we know how to differentiate functions like sin x and x 3 - 5. But how do we differentiate a function of a function? That is how can we differentiate sin (x 3 - 5)?So far, we know how to differentiate..See what our Users say :
Tutor was excellent, asnwered the question rapidly and provided the information I needed to understand the problem.
VERY HELPFULL! I understand through the formulas given to read the equation when worked great job
It was a great pleasure working with this tutor was able to take me through the steps of my math problems which was very helpful because since I don't have lots of experience with math by the tutor doing the steps it helps me understand a great deal. Im so excited that Im finally getting this amazing service. We got so much done. thank you.
Tutor Vista tutors actually helped me to think through some of the problems instead of just doing them for me.Now i am more confident with math ,Thank you all
Looking for More Help!
