Difference between revisions of "1961 IMO Problems"

Latest revision as of 20:18, 20 August 2020

Day I

Problem 1

(Hungary) Solve the system of equations:

$\begin{matrix} \quad x + y + z \!\!\! &= a \; \, \\ x^2 +y^2+z^2 \!\!\! &=b^2 \\ \qquad \qquad xy \!\!\! &= z^2 \end{matrix}$

where $a$ and $b$ are constants. Give the conditions that $a$ and $b$ must satisfy so that $x, y, z$ (the solutions of the system) are distinct positive numbers.

Solution

Problem 2

Let a,b, and c be the lengths of a triangle whose area is S. Prove that

$a^2 + b^2 + c^2 \ge 4S\sqrt{3}$

In what case does equality hold?

Solution

Problem 3

Solve the equation

$\cos^n{x} - \sin^n{x} = 1$

where n is a given positive integer.

Solution

Day 2

Problem 4

In the interior of triangle $P_1 P_2 P_3$ a point P is given. Let $Q_1,Q_2,Q_3$ be the intersections of $PP_1, PP_2,PP_3$ with the opposing edges of triangle $ABC$ . Prove that among the ratios $\frac{PP_1}{PQ_1},\frac{PP_2}{PQ_2},\frac{PP_3}{PQ_3}$ there exists one not larger than 2 and one not smaller than 2.

Solution

Problem 5

Construct a triangle ABC if the following elements are given: $AC = b, AB = c$ , and $\angle AMB = \omega \left(\omega < 90^{\circ}\right)$ where M is the midpoint of BC. Prove that the construction has a solution if and only if

$b \tan{\frac{\omega}{2}} \le c < b$

In what case does equality hold?

Solution

Problem 6

Consider a plane $\epsilon$ and three non-collinear points $A,B,C$ on the same side of $\epsilon$ ; suppose the plane determined by these three points is not parallel to $\epsilon$ . In plane $\epsilon$ take three arbitrary points $A',B',C'$ . Let $L,M,N$ be the midpoints of segments $AA', BB', CC'$ ; Let $G$ be the centroid of the triangle $LMN$ . (We will not consider positions of the points $A', B', C'$ such that the points $L,M,N$ do not form a triangle.) What is the locus of point $G$ as $A', B', C'$ range independently over the plane $\epsilon$ ?

Solution

Resources

1961 IMO (Problems) • Resources
Preceded by 1960 IMO	1 • 2 • 3 • 4 • 5 • 6	Followed by 1962 IMO
All IMO Problems and Solutions

@@ Line 35: / Line 35: @@
 [[1961 IMO Problems/Problem 3 | Solution]]
 ==Day 2==
 ===Problem 4===
-In the interior of [[triangle]] <math>ABC</math> a [[point]] ''P'' is given.  Let <math>Q_1,Q_2,Q_3</math> be the [[intersection]]s of <math>PP_1, PP_2,PP_3</math> with the opposing [[edge]]s of triangle <math>ABC</math>.  Prove that among the [[ratio]]s <math>\frac{PP_1}{PQ_1},\frac{PP_2}{PQ_2},\frac{PP_3}{PQ_3}</math> there exists one not larger than 2 and one not smaller than 2.
+In the interior of [[triangle]] <math>P_1 P_2 P_3</math> a [[point]] ''P'' is given.  Let <math>Q_1,Q_2,Q_3</math> be the [[intersection]]s of <math>PP_1, PP_2,PP_3</math> with the opposing [[edge]]s of triangle <math>ABC</math>.  Prove that among the [[ratio]]s <math>\frac{PP_1}{PQ_1},\frac{PP_2}{PQ_2},\frac{PP_3}{PQ_3}</math> there exists one not larger than 2 and one not smaller than 2.
 [[1961 IMO Problems/Problem 4 | Solution]]
@@ Line 58: / Line 59: @@
 [[1961 IMO Problems/Problem 6 | Solution]]
-==See Also==
+== Resources ==
+* [[IMO Problems and Solutions, with authors]]
+* [[Mathematics competition resources]]
+{{IMO box|year=1961|before=[[1960 IMO]]|after=[[1962 IMO]]}}

Page

Toolbox

Search

Difference between revisions of "1961 IMO Problems"

Latest revision as of 20:18, 20 August 2020

Contents

Day I

Problem 1

Problem 2

Problem 3

Day 2

Problem 4

Problem 5

Problem 6

Resources