| EXERCISES IN EUCLID. | 351 |
II. 1 to 11.
134. A straight line is divided into two parts; shew that if twice the rectangle of the parts is equal to the sum of the squares described on the parts, the straight line is bisected.
135. Divide a given straight line into two parts such that the rectangle contained by them shall be the greatest possible.
136. Construct a rectangle equal to the difference of two given squares.
137. Divide a given straight line into two parts such that the sum of the squares on the two parts may be the least possible.
138. Shew that the square on the sum of two straight lines together with the square on their difference is double the squares on the two straight lines.
1 39. Divide a given straight line into two parts such that the sum of their squares shall be equal to a given square.
140. Divide a given straight line into two parts such that the square on one of them may be double the square on the other.
141. In the figure of II. 11 if CH be produced to meet BF at L, shew that CL is at right angles to BF.
142. In the figure of II. 11 if BE and CH meet at O, shew that AO is at right angles to CH.
143. Shew that in a straight line divded as in II. 11 the rectangle contained by the sum and difference of the parts is equal to the rectangle contained by the parts,
II. 12 to 14.
144. The square on the base of an isosceles triangle is equal to twice the rectangle contained by either side and by the straight line intercepted between the perpendicular let fall on it from the opposite angle and the extremity of the base.
145. In any triangle the sum of the squares on the sides is equal to twice the square on half the base together with twice the square on the straight line drawn from the vertex to the middle point of the base.
