Thanks!, Great stuff. I was going over quadratics (from no b.s. ast math) and had a question on pg.109 question 2. I don't get why we can't go -2x^2 to the other side in 2x^2=x+5. My favorite math book by the way thank you so much
The formula for the equation of a circle negates the “h” and “k”: the formula is (x - h)^2 + (y - k)^2 = r^2, and the corresponding center is (h, k). So if it were (x - 3)^2 + (y - 6)^2, the center would be (3, 6). However, if positive numbers appear inside, like for (x + 3)^2 + (y + 6)^2, the center is negative because -(-3) is the same thing as +3 and -(-6) is the same as +6.
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Thank you for the tips 😁
You’re welcome! Always happy to help ☺️
This was soooo helpful
So happy to hear!! :)
Ahh im so nervous because my test is tomorrow. Thank you so much for helping me understand this a bit more!!:)
I’m so glad this video helped! Best of luck today - hope all goes well! ☺️
Thank you! My test is tomorrow and this was very very helpful. You explain it so easily and clearly 💕
So happy to hear the video helped! Best of luck tomorrow - rooting for you always 💕
Thanks!, Great stuff. I was going over quadratics (from no b.s. ast math) and had a question on pg.109 question 2. I don't get why we can't go -2x^2 to the other side in 2x^2=x+5. My favorite math book by the way thank you so much
So glad to hear you are loving it! You totally can do that! You can either move the 2x^2 or the x + 5. Either way, you’d get the same answer.
Hello! Can you do a video about linear and exponential growth? pls
Great idea! Will add to my video list!
at the very end why is the answer center with both negatives? also great video!!
The formula for the equation of a circle negates the “h” and “k”: the formula is (x - h)^2 + (y - k)^2 = r^2, and the corresponding center is (h, k). So if it were (x - 3)^2 + (y - 6)^2, the center would be (3, 6). However, if positive numbers appear inside, like for (x + 3)^2 + (y + 6)^2, the center is negative because -(-3) is the same thing as +3 and -(-6) is the same as +6.
And thank you btw! :)