Slični zadaci

IMO Shortlist 1971 problem 7

All faces of the tetrahedron $ABCD$ are acute-angled. Take a point $X$ in the interior of the segment $AB$ , and similarly $Y$ in $BC, Z$ in $CD$ and $T$ in $AD$ .

a.) If $\angle DAB+\angle BCD\ne\angle CDA+\angle ABC$ , then prove none of the closed paths $XYZTX$ has minimal length;

b.) If $\angle DAB+\angle BCD=\angle CDA+\angle ABC$ , then there are infinitely many shortest paths $XYZTX$ , each with length $2AC\sin k$ , where $2k=\angle BAC+\angle CAD+\angle DAB$ .

Slični zadaci

Lista Tekst Dva stupca

Zadaci

IMO Shortlist 1964 problem 5

In tetrahedron $ABCD$ , vertex $D$ is connected with $D_0$ , the centrod if $\triangle ABC$ . Line parallel to $DD_0$ are drawn through $A,B$ and $C$ . These lines intersect the planes $BCD, CAD$ and $ABD$ in points $A_2, B_1,$ and $C_1$ , respectively. Prove that the volume of $ABCD$ is one third the volume of $A_1B_1C_1D_0$ . Is the result if point $D_o$ is selected anywhere within $\triangle ABC$ ?

IMO Shortlist 1965 problem 3

Given the tetrahedron $ABCD$ whose edges $AB$ and $CD$ have lengths $a$ and $b$ respectively. The distance between the skew lines $AB$ and $CD$ is $d$ , and the angle between them is $\omega$ . Tetrahedron $ABCD$ is divided into two solids by plane $\epsilon$ , parallel to lines $AB$ and $CD$ . The ratio of the distances of $\epsilon$ from $AB$ and $CD$ is equal to $k$ . Compute the ratio of the volumes of the two solids obtained.

Školjka

IMO Shortlist 1971 problem 7

Slični zadaci

IMO Shortlist 1964 problem 5

IMO Shortlist 1965 problem 3

IMO Shortlist 1968 problem 3

IMO Shortlist 1970 problem 3

IMO Shortlist 1972 problem 5

IMO Shortlist 1972 problem 7