12 ਤਿੰਨ ਅਯਾਮੀ ਜਿਓਮੈਟਰੀ ਦੀ ਜਾਣ-ਪਛਾਣ

ਅਭਿਆਸ 2

Question:

Find the distance between the following pairs of points: (i) (2,3,5) and (4,3,1) (ii)(−3,7,2)and ((2,4,−1) (iii) (−1,3,−4) and (1,−3,4) (iv) (2,−1,3) and (−2,1,3)

Answer:

(i) Distance = √((4-2)² + (3-3)² + (1-5)²) = √(4+0+16) = √20 = 4.4721

(ii) Distance = √((2-(-3))² + (4-7)² + ((-1)-2)²) = √(5+9+9) = √23 = 4.7958

(iii) Distance = √((1-(-1))² + ((-3)-3)² + (4-(-4))²) = √(2+36+16) = √54 = 7.3484

(iv) Distance = √((-2-2)² + (1-(-1))² + (3-3)²) = √(4+2+0) = √6 = 2.4495

Question:

Show that the points (−2,3,5),(1,2,3) and (7,0,−1) are collinear.

Answer:

Step 1: Calculate the equation of the line passing through the points (−2,3,5) and (1,2,3).

Let the equation of the line passing through the points (−2,3,5) and (1,2,3) be: ax + by + cz = d

Substituting the coordinates of the points (−2,3,5) and (1,2,3) in the above equation, we get: -2a + 3b + 5c = d a + 2b + 3c = d

Solving the above equations, we get: a = -3, b = 5, c = -2, d = 13

Step 2: Substitute the coordinates of the point (7,0,-1) in the equation of the line obtained in Step 1.

Substituting the coordinates of the point (7,0,-1) in the equation of the line obtained in Step 1, we get: -3(7) + 5(0) + (-2)(-1) = 13 -21 - 2 = 13

Step 3: Check if the equation obtained in Step 2 is true.

The equation obtained in Step 2 is -23 = 13 which is false.

Therefore, the points (−2,3,5),(1,2,3) and (7,0,−1) are not collinear.

Question:

Verify the following (i) (0,7,−10),(1,6,−6) and (4,9,−6) are the vertices of an isosceles triangle (ii) (0,7,10),(−1,6,6) and (−4,9,6) are the vertices of a right angled triangle (iii) (−1,2,1),(1,−2,5),(4,−7,8) and (2,−3,4) are the vertices of a parallelogram

Answer:

(i) To verify that (0,7,−10),(1,6,−6) and (4,9,−6) are the vertices of an isosceles triangle, we need to check if two of the sides are equal.

Let AB = (0,7,−10) and (1,6,−6) and AC = (0,7,−10) and (4,9,−6).

We calculate the length of AB and AC using the distance formula.

AB = √((1-0)²+(6-7)²+(−6-(−10))²) = √(1+1+16) = √18

AC = √((4-0)²+(9-7)²+(−6-(−10))²) = √(16+4+16) = √36

Since AB = AC, the triangle is isosceles.

(ii) To verify that (0,7,10),(−1,6,6) and (−4,9,6) are the vertices of a right angled triangle, we need to check if one of the angles is 90°.

We calculate the lengths of the sides using the distance formula.

AB = √((−1-0)²+(6-7)²+(6-10)²) = √(1+1+16) = √18

AC = √((−4-0)²+(9-7)²+(6-10)²) = √(16+4+16) = √36

BC = √((−4-(−1))²+(9-6)²+(6-6)²) = √(9+9+0) = √18

We then use the Pythagorean theorem to calculate the angle.

AB² + AC² = BC²

18² + 36² = 18²

324 + 1296 = 324

Therefore, the angle between AB and AC is 90°, so the triangle is right angled.

(iii) To verify that (−1,2,1),(1,−2,5),(4,−7,8) and (2,−3,4) are the vertices of a parallelogram, we need to check if opposite sides are equal.

Let AB = (−1,2,1) and (1,−2,5) and CD = (1,−2,5) and (4,−7,8).

We calculate the length of AB and CD using the distance formula.

AB = √((1-(−1))²+((−2)-2)²+((5-1))²) = √(4+16+16) = √36

CD = √((4-(1))²+((−7)-(−2))²+((8-5))²) = √(9+25+9) = √43

Since AB = CD, the quadrilateral is a parallelogram.

Question:

Find the equation of the set of points which are equidistant from the points (1,2,3) and (3,2,−1)

Answer:

Answer: Step 1: Find the mid-point of the two given points. Mid-point = (1+3/2, 2+2/2, 3+(-1)/2) = (2,2,1)

Step 2: Find the distance between the two points. Distance = √((3-1)² + (2-2)² + (-1-3)²) = √12

Step 3: Write the equation of a sphere with radius = distance and center = mid-point. Equation of the sphere = (x-2)² + (y-2)² + (z-1)² = 12

Question:

Find the equation of the set of points P, the sum of whose distances from A(4,0,0) and B(−4,0,0) is equal to 10.

Answer:

  1. Find the distances from A(4,0,0) and B(-4,0,0) to any point P(x,y,z).

Distance from A to P: dA = √((x-4)² + y² + z²) Distance from B to P: dB = √((x+4)² + y² + z²)

  1. Set the sum of the distances equal to 10: dA + dB = 10

  2. Simplify the equation: √((x-4)² + y² + z²) + √((x+4)² + y² + z²) = 10

  3. Square both sides of the equation: (x-4)² + y² + z² + (x+4)² + y² + z² = 100

  4. Simplify the equation: 2x² + 8 = 100

  5. Solve for x²: x² = 46

  6. Take the square root of both sides: x = ±√46

  7. Therefore, the equation of the set of points P is x = ±√46, y, z.

ਜੇਈਈ ਅਧਿਐਨ ਸਮੱਗਰੀ (ਗਣਿਤ)

01 ਸੈੱਟ

02 ਸਬੰਧ ਅਤੇ ਕਾਰਜ

03 ਤ੍ਰਿਕੋਣਮਿਤੀਕ ਫੰਕਸ਼ਨ

04 ਗਣਿਤਿਕ ਇੰਡਕਸ਼ਨ ਦਾ ਸਿਧਾਂਤ

05 ਕੰਪਲੈਕਸ ਨੰਬਰ ਅਤੇ ਕੁਆਡ੍ਰੈਟਿਕ ਸਮੀਕਰਨ

06 ਰੇਖਿਕ ਅਸਮਾਨਤਾਵਾਂ

07 ਪਰਮਿਊਟੇਸ਼ਨ ਅਤੇ ਕੰਬੀਨੇਸ਼ਨ

08 ਬਾਇਨੋਮਿਅਲ ਥਿਊਰਮ

09 ਕ੍ਰਮ ਅਤੇ ਲੜੀ

10 ਸਿੱਧੀਆਂ ਲਾਈਨਾਂ ਦੀ ਕਸਰਤ

10 ਸਿੱਧੀਆਂ ਰੇਖਾਵਾਂ ਫੁਟਕਲ

11 ਕੋਨਿਕ ਸੈਕਸ਼ਨ

12 ਤਿੰਨ ਅਯਾਮੀ ਜਿਓਮੈਟਰੀ ਦੀ ਜਾਣ-ਪਛਾਣ

13 ਸੀਮਾਵਾਂ ਅਤੇ ਡੈਰੀਵੇਟਿਵਜ਼

14 ਗਣਿਤਿਕ ਤਰਕ

15 ਅੰਕੜੇ

16 ਸੰਭਾਵਨਾ