Find the exponential function f(x) = 6* that passes through the point ( – 2, 4)...
Show In Find the formula for an exponential function that passes through the two points given. (0,7) and (3,2401) f(2) Preview TIP Enter your answer as an expression. Example: 3x^2+1, x5, (a+b)/c Be sure your variables match those in the question
(1 point) The figures below show the graphs of the exponential functions f(x) and g(x), and the linear function, h(x). The function f(x) has y-intercept 0.75 and goes through the point (1,6). The function g(x) has y-intercept 6 and goes through the point (2,6/49). The function h(x) has y-intercept 5 and goes through the point (a, a + 5). y = f(x) y = g(x) y = h(x) (Click on a graph to enlarge it.) help (formulas) (a) Find a...
Find the exponential function y = cekt that passes through the two given points. y + 3 2 f(0,1/2) 14,1) 4 6 8 10 12 ya
Find the equation for an exponential function that passes through the pair of points given below. (Round all coefficients to 4 decimal placer when necessary Example 2.]Through (1,2.1) and (2,0.63)f(x) =
Question 5 (1 point) An exponential function of the form y=C · 6" passes through the points given by the table below. « y 1 98 2 3 14 2 Determine the value of b. 3 B) 4802 C) -7 E) 7 4802 o o o o o
Find a function whose graph is a parabola with vertex (4,-6) and that passes through the point (5,-3). Your answer is f(x) =
Find the exponential function y = cekt that passes through the two given points. (Enter k to 4 decimal places.) 8 7 6 5 (6,5) Y4 3 2 0, 1/3) 0 1 2 العا 4 5 6 y =
(a) Find symmetric equations for the line that passes through the point (4, -2, 6) and is parallel to the vector (-1, 3, -4) x+ 4-Y+ 2 3 z-6 -4 -(x +4) 3(y 2)-4(z +6). y+2 z-6 3 -(x-4) 3(y +2) -4(z- 6). o4-2-116 = Y - 2-z+6 3 (b) Find the points in which the required line in part (a) intersects the coordinate planes. 5 ,5,0 x ) point of intersection with xy-plane 10 7 point of intersection with...
problem 6 (1 point) Finding Equations of Exponential Functions For each of the following, find the formula for an exponential function that passes through the two points given a. (0, 2) and (4, 1250) f(t) = b. (0,12500) and (4, 20) g(x) =
(4 points) The tangent line to y = f(x) at (-3,-2) passes through the point (3.-6). Compute the following. a.) f(-3) = b.) f'(-3) =