Newer versions may rectify this issue. You may make sure by asking with the Geogebra User Forum and telling them about your problem.
Thankfully, Mathematica and Wolfram Alpha do not share this problem and can plot your graph perfectly. Also, Desmos currently seems to plot it as well. You can play with the constants on the graph I've created at Desmos The following are other equations which also give heart shapes:. If you're bored with 2D hearts, then check out Taubin's heart surface. Also check out this question about drawing a heart in mathematica. Sign up to join this community. The best answers are voted up and rise to the top.
Stack Overflow for Teams — Collaborate and share knowledge with a private group. Other than this, it's pretty much the same. It's a lot slower to draw on a real machine, which JSBeeb emulates pretty well. Colors the cells in the cardioid. Sign up to join this community. The best answers are voted up and rise to the top.
Stack Overflow for Teams — Collaborate and share knowledge with a private group. Create a free Team What is Teams? Learn more. Asked 4 years, 9 months ago. Active 11 months ago. Viewed 10k times. The equations are either: or t is in the range [-1, 1]. Improve this question. Stewie Griffin. Stewie Griffin Stewie Griffin Add a comment. Active Oldest Votes. Improve this answer. Community Bot 1. Grimmy Grimmy Why use? According to Geekosystem , "the [ In other words, with these mathematical capabilities, you can also graph fun images like the Batman symbol, for example.
See below. To find out how to create these and more fun pictures using Google's graphing feature, visit Digital World or watch the video below.
Think you can create your own cool function? The points of the Mandelbrot set, which have convergent sequences, lie inside a cardioid. Source: 5 , page ff. There you find a proof and more references. If light is falling on a spheric mirror wedding ring in the sun light , the reflecting rays form a special surface, the catacaustic. It isn't a cardioid but a nephroid. A cardioid develops as an envelope, if the rays start at a point on the circle and are reflected at the circle drawing on the right.
Microphones have a certain characteristic curve. In the plane it is a circle for the "sound-pressure-receiver" and similar to a lying eight figure for the "sound-velocity-receiver".
Special receivers like condenser microphones have both capacities. Their characteristic curve develops by overlaying to a cardioid. Lay inside a square two circles and draw some lines.
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