Hi!To solve this, we add the amount of the coupon to the discounted price.203 + 15 = 218The answer is\u00a0218Hope this helps! :)-Peredhel

As mentioned in Dr. Graubner's comment, the sum is \sqrt{\frac23}. In fact, this is a special case of a sort of famous Taylor series expansion:; \frac{1}{\sqrt{1-4z}} = \sum_{n=0}^\infty \binom{2n}{n} z^n ...

First find kernel and image of your matrix A. Then remember that A represents your linear mapping f with respect to the basis \{1,x,x^2\}. Thus, you can translate the kernel (respectively ...

Assume there is a point y_0\in\overline Y such that f(y_0)\neq g(y_0). Then, by continuity, there must be an \epsilon>0 such that for any y\in B_{\epsilon}(y_0), we have f(y)\neq g(y). But ...

The vector you give is an eigenvector associated to the eigenvalue \lambda = 3. The eigenspace associated to the eigenvalue \lambda = 3 is the subvectorspace generated by this vector, so all ...

In your example, you have u_1, u_2, u_3, v_1, v_2, and you have correctly showed that \text{mean}(u_1,u_2,u_3) + \text{mean}(v_1,v_2) is not necessarily equal to \text{mean}(u_1 + u_2 + u_3, v_1 + v_2), ...