please include your process of getting to the answer
please include your process of getting to the answer Given the curve 2 + y =...
The given point is on the curve. Find the lines that are (a) tangent and (b) normal to the curve at the given point. 4x2 + 3xy + 3y2 +17y - 4 = 0,(-1,0) (a) Give the equation of the line that is tangent to the curve at the given point y = (b) Give the equation of the line that is normal to the curve at the given point. y = Suppose that fis an odd function of x....
1.Determine the equation of the tangent to the curve at x=4 2.Given the curve , find the equations to the tangents at x=5. Include in your solution a labeled sketch of the situation. (Yes, that said tangents! there is more than one solution to this problem!) Personal advice: Think about Implicit differentiation and logarithmic differentiation. Only use Grade 12 Calculus knowledge. All = (3)! (x - 2)2 + (y + 1)2 = 36
Please give the answer symbolically, thank you. The temperature at a point (x, y, z) is given by T(x, y, z) = 102-3x2 – 3y2 – 222 In which direction does the temperature increase fastest at the point (3, 1, 4)? Express your answer as a UNIT vector.
Let Select all that apply Let z =f(x,y)= arctan(3x In(6) Select all that apply Your answer: The slope of the tangent line to the curve obtained by intersecting the 9 surface z =f(x,y) and plane x = 3 at the point (3,6) is 6(811n (36) + 1) + fxy 54x2In(6y)+3) y(18x2in(6) + 1)2 (fxx (4,2))-(fvx(4,2)) = 0 The slope of the tangent line to the curve obtained by intersecting the 3In(36) surface z = f(x,y) and plane x = 3 at...
(1 point) Given the parametric curve *(t) =t(t? - 3), y(t) = 3(t? - 3) answer the following questions. - Part 1 - 1 point Find all the points on the curve at which a horizontal tangent line exists. Enter your solution as a comma separated list of ordered pairs (a,b) or if there are no points on the curve with a horizontal tangent line enter NONE help (points) Part 2 - 1 point
Let C be the curve (x - 3)2 + 9(y – 1)2 = 36, x +2y + z = 4, oriented counterclockwise when viewed from high on the z-axis. Let F be as shown below. Evaluate $.F. F.dr. F= (32² + 3y² + sin x? )i + (6xy + 3z)j + (x2 + 2yz)k $. F. dr= (Type an exact answer.) с
calculo 1- Given the function y = (4-x^2 ) + 4 * arcsen (x/2) Get dy/dx and its value for x 0 (this year is requested to find the value of the pending for the function given in Point X :0). 2- Is yarcta n ((x +3)/(1-3x) Find his derivative 3- Determine dy,/ dx and the value at the point (using implied derivation) 2x 2 y 2-3xy 1 0 3x2Уз + 3xy2 +1-6+,5 2xy + sen(y) # 2 6 Determine...
please answer (1 point) Find the equation (in terms of x and y) of the tangent line to the curve r = 5 sin 30 at 0 = a/3. y =
Let the curve C in the (x, y)-plane be given by the parametric equations x = e + 2, y = e2-1, tER. (a) Show that the point (3,0) belongs to the curve C. To which value of the parameter t does the point (3,0) correspond? (b) Find an expression for dy (dy/dt) without eliminating the parameter t, i.e., using de = (da/dt) (c) Using your result from part (b), find the value of at the point (3,0). (d) From...
please answer fast For the differential equation = (y + 1)(3-y), (a)Find the steady stat solutions and inflation points of your solution curve y(t) (b)Draw the graph of glu) vs. y, where g(u)Your steady stats and stability arrows must be indicated on the graph- (c) Draw the solution curve y(t for initial value problem y(0)4, vith proper concavity, asymptotic behavior and points of inflection. For the differential equation = (y + 1)(3-y), (a)Find the steady stat solutions and inflation points...