...but in the hyperbola C P1-C Q1=C P2-DP x PE =s (6. ii.) C D1 =*C Ea. BOOK 200. In an ellipse the sum of the squares of any two .conjugate diameters is equal to the sum of the squares PROP- of the axes ; but in an hyperbola the difference of the Fig. 83, 84. squares...

...drawn, is equal to the square of CA, the semidiameter. Fer CE1-r.CG'=CE«+AE.En=CAl. COR. 3. The sum of the squares of any two conjugate diameters, is equal to the sum of the squares of ihe axes. Let Aa, B6 be the axes, and Pp, Qtf any two conjugate diameters ; tlraw...

...contained by the Segments of the other 144 J-, SECT. II. On the Properties of Conjugate Diameters. The Sum of the Squares of any two Conjugate Diameters is equal to the Sum of the Squares of the Axes 146. The Area of Circumscribing Parallelograms, whose sides are Parallel...

...to the sum of the squares of the ordinates drawn from the conjugate to the axis, . . . .92 The sum of the squares of any two conjugate diameters is equal to the sum of the squares of the transverse and conjugate diameters, . . .93 The sum of the squares of any...

...Segments of the other ................ 144 SECT. II. On the Properties of Conjugate Diameters. The Sum of the Squares of any two Conjugate Diameters is equal to the Sum of the Squares of the Axes ................ 146 The Area of Circumscribing Parallelograms, rvkose...

...CP'-PT'-A^-B*, A'*-PT!'=A8-B". Now, it has already been proved, that the difference of the squares of the two conjugate diameters is equal to the difference of the squares of the axes (Prop. VIII, Sch. 11). But A and B are the semi-axes, and A' is a semi-diameter: hence, PT must...

...the square of CR the semi-diameter. For CE* + CG* = CE* + RE • E/- = CR* (5, 2, E.) COR. 3. The sum of the squares of any two conjugate diameters is equal to the sum of the squares of the axes. Let Rr, Ss be the axes, and Pp, Qq any two conjugate diameters ; draw...

...to the segments intercepted on CG from C by perpendiculars on it from Q and D. COR. 3. — The sum of the squares of any two conjugate diameters is equal to the sum of the squares of the transverse and conjugate axis. For CD2 + CQ2 = CK2 + KD2 + CN2 + NQ2 = (CK2...

...drawn from the vertices of two semi-conjugates to the axis. Cor. 6. From this it appears Chat the sum of the squares of any two conjugate diameters is equal to the sum of the squares of the transverse and conjugate diameters. For Ac2 + cD2 = (N O2 + R X2 + cX2 +...

...A* - B*, A'*-PTf=At-B*. Now, it has already been proved, that the difference of the squares of the two conjugate diameters is equal to the difference of the squares of the axes (Prop. VIII, Sch. 11). But A and B are the semi-axes, and A' is a semi-diameter: hence, PT must...