Symmetry Determine whether the graphs of the ...

Question

Symmetry Determine whether the graphs of the following equations and functions are symmetric about the x-axis, the y-axis, or the origin. Check your work by graphing.

$x^{\frac{2}{3}} + y^{\frac{2}{3}} = 1$

Accepted Answer

Welcome back everyone. Let's consider the following equation of X to the power of 4/5 minus Y to the power of 4/5 equals five. We want to find if the graph would be symmetric about the X axis, the Y axis or the origin A says the X axis B, the Y axis C the origin and the D says all of the above. Now how can we test each of these conditions on our equation to figure out the graph would be symmetric under those conditions? Well, let's start by testing if it's symmetric about the Y axis first, let's replace X in our equation. OK. With negative X. Now when we do that, our equation is going to be negative X to the power of 4/5 OK, minus Y to the power of 4/5 equal to five. Now, if we simplify our equation and get back the given equation, the original equation that means it is symmetrical about the Y axis. Now, here we could rewrite negative X to the power of 4/5 as negative X to the power of four. OK. Let me write that properly here. Negative X to the power of four raised to the power of 1/5. OK. Now we know that negative X to the power of four is going to be equal to X to the fourth. So that's X to the fourth raised to the power of 1/5. OK? Minus Y to the power of 4/5 equal to five. And we know that when we raise one power to another, we multiply them and four multiplied by 1/5 equals four to the fifth. Therefore, we end up back with X to the 4/5 minus Y to the 4/5 equals five. That tells us that the equation is symmetrical. OK. I bought the wire access so that we know is true. Now let's test the other conditions. OK? To test if it is symmetrical about the X axis, we can replace Y with negative Y, OK. So replace Y with negative Y. When we do that, our equation is going to become X to the 4/5 minus negative Y raised to the power of 4/5 equal to five. And again, we can kind of think about it in the same way as we did before we can rewrite. OK. Our Y term as Y to sorry negative Y to the fourth, OK. Raised to the fifth, OK equals five. And now we know a negative Y to the fourth will simplify as Y to the fourth and Y to the fourth multiply sorry, Y to the fourth, raised to 1/5 equals Y to the 4/5. OK. So now is going to be X to the 4/5 minus Y to the 4/5 equals five. We get back the same equation. Therefore, that tells us the equation OK. Is symmetrical about the oops, let me write that properly here about the X axis now that we know that, so it's symmetrical about the Y axis about the X axis. Let's test our final condition. Is it symmetrical about the origin? Well, to test that we can replace X with X. OK. And why with negative Y when we do that? OK. Our equation is going to become negative X to the 4/5. OK, minus negative Y to the power of 4/5 equals five. And like we saw in our previous examples, negative X to the 4/5 will eventually simplify the X to the 4/5 and negative Y to the power of 4/5 will simplify to Y to the 4/5. So again, we end up with our same equation. This tells us then that the equation is symmetrical about the origin. OK. Therefore, our equation is symmetrical about the X axis about the Y axis and about the origin. If we go back to our answer choices, that means all of the above is the correct answer. D Thanks for watching everyone. I hope this video helped.

Symmetry Determine whether the graphs of the following equations and functions are symmetric about the x-axis, the y-axis, or the origin. Check your work by graphing.
$x^{\frac{2}{3}} + y^{\frac{2}{3}} = 1$

Key Concepts

Symmetry in Graphs

Graphing Functions

Implicit Functions

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