Consider the eigenvalue problem: ax = 1x, x = 0 where x is a non-zero eigenvector and 2 is eigenvalue of a. prove that the determinant ia – 271 = 0. (hint: if a matrix is not full-rank (has linearly dependent columns), it is singular and non-invertible)

p ÷ r = tan(x)

step-by-step explanation:

given that there is a figure below shows a right triangle: a right triangle is shown with hypotenuse equal to q units and the length of the legs equal to p units and r units.

graph is missing so i will create the graph as per given information.

the angle between the legs having lengths p units and q units is y degrees. the angle between the legs having lengths r units and q units is x degrees.

now we need to find about what is p ÷ r equal to.

so we can use trigonometric ratio tan(x)=[altitude]/[base] to find the value of p ÷ r, because p is the altitude and r is the base.

p ÷ r=tan(x)

hence final answer is p ÷ r=tan(x).