DVI exam
DVI is an exam in mathematics at the Moscow State University named after M.V. Lomonosov. The first four problems have a standard level. Problem 5 is advanced level of geometry. Problem 6 is an advanced level equation or inequality. Problem 7 is advanced level of stereometry.
Below are the most difficult problems of this exam in recent years. The headings indicate the year when the problem was used, the variant option of the exam, and the number of the problem.
Contents
- 1 2011 Problem 8
- 2 2012 Problem 8
- 3 2014 1 Problem 6
- 4 2014 1 Problem 8
- 5 2015 1 Problem 7
- 6 2016 2 Problem 7
- 7 2016 2 Problem 8
- 8 2020 201 problem 6
- 9 2020 202 problem 6
- 10 2020 203 problem 6
- 11 2020 204 problem 6
- 12 2020 205 problem 6
- 13 2020 206 problem 6
- 14 2021 215 problem 7
- 15 2022 221 problem 7
- 16 2022 222 problem 7
- 17 2022 222 problem 6
- 18 2022 224 problem 6
- 19 2023 231 problem 6
- 20 2023 231 EM problem 6
- 21 2023 232 problem 6
- 22 2023 233 problem 6
- 23 2024 Problem 18 (EGE)
- 24 2024 Test problem 7
- 25 2024 var 241 Problem 2
- 26 2024 var 242 Problem 7
- 27 2024 var 243 Problem 6
- 28 2024 var 244 Problem 7
- 29 2024 var 247 Problem 6
2011 Problem 8
Solve the system of equations Standard Solution Denote We get First equation define inner points of the circle with radius and the circle. The distance from the straight line to the origin of the coordinate system is so the system of the equations define the only tangent point of the circle and the line. Short Solution
2012 Problem 8
Let the tetrahedron be given.
A right circular cylinder is located so that the circle of its upper base touches each of the faces which contains vertex
The circle of the lower base lies in the plane and touches straight lines and
Find the height of the cylinder.
Solution
Denote the midpoint Plane is the bisector plane of segment
The inradius of equal to distance from incenter to vertex is
Denote the foot from to
Denote the crosssection of by plane of the upper base of cylinder, is the incenter is the point of tangency incircle of and
Denote and the foots from and to Denote the radius
The circle of the lower base inscribed in angle equal to so Projection from the point maps onto
Answer:
2014 1 Problem 6
Find all pares of real numbers satisfying the system of equations Solution
Denote Denote is the solution. Let If then if then therefore is the single root.
2014 1 Problem 8
Let
Find and
Solution where
Answer:
2015 1 Problem 7
A sphere is inscribed in a regular triangular prism with bases Find its radius if the distance between straight lines and is equal to where and are points lying on and , respectively, and
Solution
The distance from the center of the sphere to the centers of the prism faces is equal to so
In order to find the distance between the lines and , one can find the length of two perpendiculars and to the line that are perpendicular to each other. Then since, when viewed along a straight line , the segment is the altitude of a right triangle with legs and
The plane containe the straight line The straight line crossed at the point In a right triangle is the height falling on the hypotenuse,
Let be the projection of onto plane
Therefore is the projection of onto plane at the point Answer:
2016 2 Problem 7
Let the base of the regular pyramid with vertex be the hexagon with side The plane is parallel to the edge , perpendicular to the plane and intersects the edge at point so that The lines along which intersects the plane and the base plane are perpendicular.
Find the area of the triangle cut off by the plane from the face
Solution
Denote
are the midpoints of respectively.
Plane is the plane symmetry of pyramid,
By condition so exist point
is the line along which intersects the plane, is the line along which intersects the base plane, so
We use the top wiew and get Denote and use the side wiew.
Triangle is the regular triangle with side , so Answer: 8.
2016 2 Problem 8
Find the smallest value of the expression Solution Denote The shortest length of a broken line with fixed ends is equal to the distance between points and which is and is achieved if points and are collinear. Answer:
2020 201 problem 6
Let a triangular prism with a base be given, Find the ratio in which the plane divides the segment if
Solution
Let be the parallel projections of on the plane
We use and get Let
Similarly
Answer:
2020 202 problem 6
Let a tetrahedron be given, Find the cosine of the angle between the edges and
Solution
Let us describe a parallelepiped around a given tetrahedron
and are equal rectangles.
and are equal rectangles.
Denote Answer:
2020 203 problem 6
Let a cube with the base and side edges be given. Find the volume of a polyhedron whose vertices are the midpoints of the edges
Solution
Denote the vertices of polyhedron Triangles and are equilateral triangles with sides and areas
This triangles lies in parallel planes, which are normal to cube diagonal The distance between this planes is So the volume of the regular prism with base and height is
Let the area be the quadratic function of Let Suppose, we move point along axis and cross the solid by plane contains and normal to axis. Distance from to each crosspoint this plane with the edge change proportionally position along axes, so the area is quadratic function from position.
Answer:
2020 204 problem 6
Let a regular triangular pyramid be given. The circumcenter of the sphere is equidistant from the edge and from the plane of the base of the pyramid. Find the radius of the sphere inscribed in this pyramid if the length of the edge of its base is
Solution
Answer:
2020 205 problem 6
Let the quadrangular pyramid with the base parallelogram be given.
Point Point
Find the ratio in which the plane divides the volume of the pyramid.
Solution
Let plane cross edge at point We make the central projection from point The images of points are respectively. The image of is the crosspoint of and So lines and are crossed at point Let’s compare volumes of some tetrachedrons, denote the volume of as Answer: 1 : 6.
2020 206 problem 6
Given a cube with the base and side edges Find the distance between the line passing through the midpoints of the edges and and the line passing through the midpoints of the edges and
Solution
Let points be the midpoints of respectively. We need to prove that planes and are parallel, perpendicular to Therefore,
Point is the midpoint For proof we can use one of the following methods:
1. Vectors: Scalar product Similarly,
2.
3. Rotating the cube around its axis we find that the point move to , then to then to
Answer:
2021 215 problem 7
The sphere touches all edges of the tetrahedron It is known that the products of the lengths of crossing edges are equal. It is also known that Find
Solution
The tangent segments from the common point to the sphere are equal.
Let us denote the segments from the vertex to the sphere by
Similarly, we define If then
If
The tetrahedron is a regular pyramid with a regular triangle with side at the base and side edges equal to
Answer: 3.
2022 221 problem 7
The volume of a triangular prism with base and side edges is equal to Find the volume of the tetrahedron where is the centroid of the face is the point of intersection of the medians of is the midpoint of the edge and is the midpoint of the edge
Solution
Let us consider the uniform triangular prism Let be the midpoint of be the midpoint of be the midpoint of be the midpoint of
The area of in the sum with the areas of triangles is half the area of rectangle so Denote the distance between these lines The volume of the tetrahedron is The volume of the prism is
An arbitrary prism is obtained from a regular one as a result of an affine transformation.
All points on the tetrahedron are defined affinely, which means that the volume ratio will be preserved.
Answer: 5.
2022 222 problem 7
A sphere of diameter is inscribed in a pyramid at the base of which lies a rhombus with an acute angle and side Find the angle if it is known that all lateral faces of the pyramid are inclined to plane of its base at an angle of
Solution 1
Denote rhombus is the vertex of a pyramid is the center of the sphere, is the tangent point of and sphere, Solution 2
The area of the rhombus
The area of the lateral surface is Answer:
2022 222 problem 6
Find all possible values of the product if it is known that and it is true
Solution
Let then for each equation is true, Let no solution.
Answer:
2022 224 problem 6
Find all triples of real numbers in the interval satisfying the system of equations
Solution
Denote Similarly,
Therefore Answer:
2023 231 problem 6
Let positive numbers be such that
Find the maximum value of
Solution Similarly Adding this equations, we get: If then
Answer:
Explanation for students
For the function under study it is required to find the majorizing function This function must be a linear combination of the given function and a constant,
At the supposed extremum point the functions and their derivatives must coincide
2023 231 EM problem 6
Find the maximum value and all argument values such that .
Solution because and signs of and are different, so Therefore
2023 232 problem 6
Let positive numbers be such that Find the maximum value of
Solution
It is clear that and Denote So If then
Answer:
2023 233 problem 6
Let positive numbers be such that
Find the maximum value of
Solution
Let Then
Equality is achieved if
Answer:
2024 Problem 18 (EGE)
Find those values of the parameter a for which the system of equations has exactly one solution: Solution
1. Special case exactly one solution.
2.
3. We solve the first equation with respect and get
This solution is shown in the diagram by red curve.
We solve the second equation with respect and get This solution is shown in the diagram by segments which connect point with axis
Each solution of the system is shown by the point of crosspoint red curve with segment.
If then segment (colored by blue) is tangent to red curve (discriminant is zero), so we have two solutions (1,1) and
If we get three solutions (colored by yellow).
In other cases the system has exactly one solution.
Answer:
2024 Test problem 7
Find all values of the parameter a for which there is at least one solution to the inequality on the interval
Solution
where where
The equation has solutions and if so given inequality has the solution for these if so given inequality has the solution for these
no solution of the given inequality.
no solution of the inequality if
If no solution of the inequality.
If no solution of the given inequality.
If no solution of the given inequality.
2024 var 241 Problem 2
The natural numbers form a strictly increasing arithmetic progression. Find all possible values of if it is known that is odd, and
Solution
is odd, so
Let the common difference may be increasing arithmetic progression exist.
Let the common difference may be increasing arithmetic progression exist.
Let can not be the natural number.
Answer:
2024 var 242 Problem 7
The base of the pyramid is the trapezoid
A sphere of radius touches the plane of the base of the pyramid and the planes of its lateral faces and at points and respectively.
Find the ratio in which the volume of the pyramid is divided by the plane if the face is perpendicular to the plane and the height of the pyramid is
Solution
A sketch of the given pyramid is shown in the diagram. The planes and intersect along the straight line that is, the planes form the lateral surface of a prism into which a sphere with center at point is inscribed.
The plane containing the point and perpendicular to contains points and Plane intersects parallel lines and at points and respectively.
Let be the line parallel to The plane cuts off the pyramid with volume from the pyramid with volume
and equal to the distance from to and equal to the distance between and Consider a right triangle is the area of into which a circle with radius is inscribed. We are looking for Let be the distance from to the plane Answer:
2024 var 243 Problem 6
Solve the system of equations in the positive
Solution (after Natalia Zakharova) Answer:
2024 var 244 Problem 7
Let be the cube, . Let
Find the ratio in which the plane divides the volume of the cube.
Solution
1. Let lie on the ray So
Similarly, is the midpoint is the midpoint
2.
regular pyramids are equal So (midpoint ) lies in plane
Let be the midpoint symmetric to with respect so
Similarly where midpoint the midpoint
For each point on the edges of the solid forming a part of the cube cut off by a plane from the side of vertex one can find a point symmetrical relative to the center of the cube on the edges of the solid forming another part of the cube.
It means that these parts are congruent and the plane divides the cube in half.
Answer:
2024 var 247 Problem 6
Real numbers and satisfy the system of equations Find the largest possible value of
Solution
In coordinates and the first equation defines the plane the second - a sphere with the center at the origin. They are shown in the diagram.
The solution of the given system (if it exists) is a circle symmetrical with respect to the plane This plane intersects the plane of the first equation along the line on which the points of maximum (E) and minimum (D) of the values of are located.
At these points the system takes the form These system has two solutions so solution of the given system exist.
Answer:
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