Question 12 Find an equation of the form y = a* + k for the graph...
#2 Using transformation, give the equation of each graph. Write the answer of the form y = a(x - h)? + k or x = a(y - k)2 +h a) b) c) 3 3 2 3 4 5 -6-5-4-3-2-1 -2 1 -5 -4 41 -6 - -2 -1 -3 10 12
[Question 1] Find and graph the domain of the function f(,y)-In-) Question 2] Graph a contour map of the function f(z, y)2s y 1 that contains four level curves. Make sure to find an equation for each level curve and label each one on the graph. IQuestion 3] The equation of the tangeat plane to the function z the equation: Using the form of the equatioa above, fiud the tangent plane to f(a,y)yat the point (2. ). Question 4] Find...
find an equation for the following graph of the form y=a sin(x) round answer to two decimal places if necessary Round your answers to two decimal places ifr 5 4 3+ 2+ 1 rad -628 -4.71 -3.14 -157 157 3.N 471 28 -3 y = sin(x)
For problems 8-12, use the graph of y=f(x) and the table for g(x) and g'(x) to compute the indicated derivatives. Write your final answer and only your final answer) in the space provided. Answers should be exact and fractions should be used where appropriate (do not use numbers in decimal form). 1 -4 -2 g(x) 2 5/2 3 14/5 &'(x) 7/5 1/2 1/4 -1/4 0 2 قيا 2 - 1 -2 - 1/2 4 0 5 6 8 1 6...
Question 12 (3 points) Match the quadratic equation with the form it represents. y = -5 (x – 3) (x + 1) 1. Standard Form 2. Vertex Form y= -x2 + 2x – 7 3. Intercept Form y=3(x + 2)2 - 1
The differemtial equation has an implicit general solution of the form F(x,y)= K, where K is an arbitary constant. In fact, because the differential equation is separable, we can deifine the solution curve implicitly by a function in the form: F(x,y)=G(x)+H(y) = K Find such a solution and then give the related functions requested. F(x,y)=G(x)+H(y)=???? dy 10.0 +7 9y? + 18y +3
Use the vertex (h, k) and a point on the graph (x,y) to find the general form of the equation of the quadratic function. (h, k) - (-3, -1), (X,Y) - (-5,3)
QUESTION 5 The graph of x)+ bxtc and the straight line g are sketched below. A and B are the points of intersection of f and g. A is also a turning polnt of f. The graph of f intersects the x-axis at B(3:0) and C. The axis of symmetry of fis x 1 2) 2) Write down the co-ordinates of C. 5.1 Determine the equation off in the form)-x2 + bx + c 5.2 Determine the range of f....
equation 2 is eV=hf 3. Solve Equation 2 for V. Express your result in the form y = mx where V corresponds to y and f corresponds to x. a. Sketch (i.e., don't use data) a graph of V as a function of f. Use the back of this page for your sketch. What is the physical meaning of the slope of the graph you have just sketched? C. If your graph was a plot of exper Planck's constant from...
2. Use Definition to find the equation of the tangent line to the graph of the equation y- 1/2 at -2 3. Find the points on the graph of y2-/2 at which the tangent line is parallel to the line y - 3. 4. Sketch the graph of a continuous function f that satisfies all of the stated conditions. f(0) 2, f(-2)- (2)-0, f(-2) f(O)-f'(2)-0 f"(z) > o if-2<zco, f,(z) < 0 if <-2 or x > 0; 2. Use...