CAPS · Grade 10 · Paper 2 · R
K(−3; 0) and L(1; −6) are points on the Cartesian plane. Determine: (a) the length of KL (two decimal places), (b) the coordinates of M, the midpoint of KL, and (c) the gradient of KL.
K(1; −5) and L(−1; −2) are points on the Cartesian plane. Determine: (a) the length of KL (two decimal places), (b) the coordinates of M, the midpoint of KL, and (c) the gradient of KL.
K(−3; −1) and L(3; 2) are points on the Cartesian plane. Determine: (a) the length of KL (two decimal places), (b) the coordinates of M, the midpoint of KL, and (c) the gradient of KL.
P(−2; −2) and Q(2; −5) are points on the Cartesian plane. Determine: (a) the length of PQ (two decimal places), (b) the coordinates of M, the midpoint of PQ, and (c) the gradient of PQ.
S(1; −4) and T(4; −2) are points on the Cartesian plane. Determine: (a) the length of ST (two decimal places), (b) the coordinates of M, the midpoint of ST, and (c) the gradient of ST.
A(2; 3) and B(0; 7) are points on the Cartesian plane. Determine: (a) the length of AB (two decimal places), (b) the coordinates of M, the midpoint of AB, and (c) the gradient of AB.
S(−3; −5) and T(−7; −8) are points on the Cartesian plane. Determine: (a) the length of ST (two decimal places), (b) the coordinates of M, the midpoint of ST, and (c) the gradient of ST.
P(3; 3) and Q(0; −1) are points on the Cartesian plane. Determine: (a) the length of PQ (two decimal places), (b) the coordinates of M, the midpoint of PQ, and (c) the gradient of PQ.
S(1; −1) and T(−2; −5) are points on the Cartesian plane. Determine: (a) the length of ST (two decimal places), (b) the coordinates of M, the midpoint of ST, and (c) the gradient of ST.
S(−3; −3) and T(2; −6) are points on the Cartesian plane. Determine: (a) the length of ST (two decimal places), (b) the coordinates of M, the midpoint of ST, and (c) the gradient of ST.
P(2; 3) and Q(8; 6) are points on the Cartesian plane. Determine: (a) the length of PQ (two decimal places), (b) the coordinates of M, the midpoint of PQ, and (c) the gradient of PQ.
P(−5; −5) and Q(1; 0) are points on the Cartesian plane. Determine: (a) the length of PQ (two decimal places), (b) the coordinates of M, the midpoint of PQ, and (c) the gradient of PQ.