Determine if 3 is a zero of the p(x)= √(x^2-4x+3) + √(x^2-9) - √(〖4x〗^2-14x+6)
Answers
Answer:
p(x)=\sqrt{x^2-4x+3}. put x=3 we get, p(3)=0. Therefore 3 is a root of p(x)
Answer:
There are x4+57x+15 pens to be distributed in a class of x2+4x+2 students. Each student get the maximum possible number of pens. Find the number of pens received by each student and the number of pens left undistributed.There are x4+57x+15 pens to be distributed in a class of x2+4x+2 students. Each student get the maximum possible number of pens. Find the number of pens received by each student and the number of pens left undistributed.There are x4+57x+15 pens to be distributed in a class of x2+4x+2 students. Each student get the maximum possible number of pens. Find the number of pens received by each student and the number of pens left undistributed.There are x4+57x+15 pens to be distributed in a class of x2+4x+2 students. Each student get the maximum possible number of pens. Find the number of pens received by each student There are x4+57x+15 pens to be distributed in a class of x2+4x+2 students. Each student get the maximum possible number of pens. Find the number of pens received by each student and the number of pens left undistributed. the There are x4+57x+15 pens to be distributed in a class of x2+4x+2 students. Each student get the maximum possible number of pens. Find the number of pens received by each student and the number of pens left undistributed. of pens left undistributed.There are x4+57x+15 pens to be distributed in a class of x2+4x+2 students. Each student get the maximum possible number of pens. Find the number of pens received by each student and the number of pens left undistributed.There are x4+57x+15 pens to be distributed in a class of x2+4x+2 students. Each student get the maximum possible number of pens. Find the number of pens received by each student and the number of pens left undistributed.