17(5)
PROBLEM VI.
Having a right line given BC, and alſo a circle whoſe center is A, it is re-
quired to draw another circle, whoſe Radius ſhall be equal to a given right line
Z, and which ſhall touch both the given line and alſo the given circle.
quired to draw another circle, whoſe Radius ſhall be equal to a given right line
Z, and which ſhall touch both the given line and alſo the given circle.
Limitation.
Then the Diameter of the circle required muſt not be given
leſs than the ſegment of a line, drawn from the center of the given circle, per-
pendicular to the given line, which is intercepted between the ſaid line and the
convex circumference; viz. not leſs than BD.
leſs than the ſegment of a line, drawn from the center of the given circle, per-
pendicular to the given line, which is intercepted between the ſaid line and the
convex circumference; viz. not leſs than BD.
Limitation.
Then the given line muſt not be in the given circle, neither
muſt the Diameter of the circle required be given leſs than that portion of the
perpendicular, drawn from the center of the given circle to the given line, which
is intercepted between the ſaid line and the concave circumference; viz. not leſs
than BD.
muſt the Diameter of the circle required be given leſs than that portion of the
perpendicular, drawn from the center of the given circle to the given line, which
is intercepted between the ſaid line and the concave circumference; viz. not leſs
than BD.
From A draw AB perpendicular to BC, cutting the given circumference in D;
and in this perpendicular let BG and DF be taken each equal to the given line
Z; and through G draw GE parallel to BC; and with center A and diſtance
AF let an arc be ſtruck, which by the Limitations will neceſſarily either touch
or cut GE; let the point of concourſe be E, let AE be joined, and, if neceſſary,
be produced to meet the given circumference in H; then with E center and
EH diſtance deſcribe a circle, and I ſay it will be the required circle; it is evi-
dent it will touch the given circle: and becauſe AD and AH are equal, as alſo
AF and AE, therefore DF (which was made equal to Z) will be equal to HE:
let now EC be drawn perpendicular to BC, then GBCE will be a Parallelogram,
and EC will be equal to GB, which was alſo made equal to Z: hence the
circle will alſo touch the given line BC, becauſe the angle ECB is a right
one.
and in this perpendicular let BG and DF be taken each equal to the given line
Z; and through G draw GE parallel to BC; and with center A and diſtance
AF let an arc be ſtruck, which by the Limitations will neceſſarily either touch
or cut GE; let the point of concourſe be E, let AE be joined, and, if neceſſary,
be produced to meet the given circumference in H; then with E center and
EH diſtance deſcribe a circle, and I ſay it will be the required circle; it is evi-
dent it will touch the given circle: and becauſe AD and AH are equal, as alſo
AF and AE, therefore DF (which was made equal to Z) will be equal to HE:
let now EC be drawn perpendicular to BC, then GBCE will be a Parallelogram,
and EC will be equal to GB, which was alſo made equal to Z: hence the
circle will alſo touch the given line BC, becauſe the angle ECB is a right
one.