Ask a New Question

Question

Find the points of intersection for y=e^x and y=sin(2x). are there an infamous (sp?) number of points of intersection for these equations?
14 years ago

Answers

katie
infinite not infamous my bad :)
14 years ago
bobpursley
No, the sin curve oscillates between -1 and +1.
The e^x curve aims off to the heavens.
14 years ago
mini
show that the line y=2x-3 and 2y+x+1=0 are perpendicular to each other
9 years ago

Related Questions

find the points of intersection of the parabolas Y=(1r2 x^2) and Y=10x - 2. find the points of intersection of the following algebraically y=2^x + 4^x y=2^x+1 - 4^x+1 I... Find the points of intersection of the graphs of the functions y=4x^2-25 and y=0. -5/2,5/2 Find the... Find all points of intersection (r,theta) of the curves r=4cos(theta), r=1sin(theta). Next find the... Find the points of intersection of the graphs of the equations. x = 3 − y^2 y = x − 1 Find the intersection points for the circles: (x+2)^2+(y-3)^2=25 and (x-1)^2+(y+4)^2=16 Find the points of intersection of the curvesr=1+2sinθ and r=2.If your answer involves π, write "pi"... Find all points of intersection (r,θ) of the curves r=2cos(θ), r=4sin(θ). Note: In this problem th... Find all points of intersection of the line {p:p = t(1, -3, 6)} and the plane {p:x + 3y + z = 2}...
Ask a New Question
Archives Contact Us Privacy Policy Terms of Use