If P has coordinates $(2, 4, 5)$ in 3D, the perpendicular distance from P to the XY-plane is:
A$2$
B$4$
C$11$
D$5$
Answer & Solution
Correct answer: D. $5$
Distance from any point to the XY-plane equals $|z|$. Here $z = 5$.
Related questions
Penalty for wrong answers : THERE WILL BE PENALTY FOR WRONG ANSWERS MARKED BY A CANDIDATE Penalty for wrong answers : THERE WILL BE PENALTY FOR WRONG ANSWERS MARKED BY A CANDIDATE For [[1,2],[2,4]], the determinant equals:If A is invertible, |A^{−1}| equals:For a 3 × 3 non-singular A with |A| = 5, the value of |adj A| is:For a non-singular square matrix A of order n, |adj A| equals:For non-singular A, B of the same order, (AB)^{−1} equals:For a non-singular A, (A^{−1})^{−1} equals: