Let me express this in algebra form.
Lets put Quail as Q, and Chicken as C.
3C-210/2Q = 1/3
Lets bring 2Q into 3C.
We can use cross multiplication.
There are 315 Quail eggs.
But, we want the total number of eggs at the end, so we must find the amount of chicken eggs too.
We want 3C-210.
So the total number of eggs is 105+315=420 eggs at the end.
Let me express this using algebra. Vernon is V, Walsh is W, and the number of staps sold per person is X.
V= 2/5W which is 5/2V= W
Let me bring V= 2/5W into W-X=57*3 first.
We can subtract V-X=57 from 5/2V-X=57*3
Okay, almost done!
Let's bring V=76 into 5/2V= W
So W= 190 and V=76
Any questions? I hope this helped.
Let's write it out using algebra. Iskander is I, Anthony is A, and Sean is S.
Let's solve for I first.
Lets bring A= I+13 into S=(A+I)2
Lets bring S=4I+26 and A= I+13 into I+A+S=555
But, we want A. So we bring I=86 into A= I+13.
Hope this helps.
When the denominator is 0, the fraction is undefined. the denominator in this problem is y^2 -5y +4 +y^2 -6y.
We want this to be 0, so I add that at the end.
y^2 -5y +4 +y^2 -6y=0
We can simplify this.
2y^2 -11y +4=0
Bring that into the quadratic equation, and then you should have the answer.
Hope this helps.
The general equation for any circle uses this:
(x-h)^2 + (y-k)^2 = r^2 with (h, k) being the center and r being the radius.
We already know what the center is, so now all we need to do is find the radius. we can easily find the radius with the pythagorean theorem.
We can imagine a right triangle with the radius from (2, 2) to (4, 5) as the hypotenuse.
Let's look for the legs first. 4-2=2. The second leg is 5-2=3.
2^2 + 3^2 = square root of 13
We can bring r^2 and (h,k) into the general equation.
The equation you are looking for is (x-2)^2 + (y-2)^2 = 13
I hope this helps.
First of all, this problem asks for integers, which means that you want the sum of integers from -12 to 13, inclusive. we can ignore the zero, because there is no value of that. Numbers -12 to 12 cancel out with their opposite number. this leaves one number, 13. The sum of the integers between -12.1 and 13.3 is just 13.