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If two equal chords of a circle . . .

Question : If two equal chords of a circle intersect within a circle. Prove that the segment of one chord are equal to the corresponding segment of another.

Doubt by Samridhi

Solution : 

Given :  A circle with centre O. AB and CD are two chords such that AB=CD. 




To Prove : 
(i) AP=DP
(ii) BP=CP

Construction : Draw OM⊥AB and ON⊥CD

Proof : 
(i) In ∆OMP and ∆ ONP
OMP = ∠ONP (Each 90°)
OP = OP (Common)
OM = ON (Equal chords are equidistant from the centre of a circle)
∆OMP∆ONP (By RHS)
MP=NP — (1)  (By CPCT)

AM=BM (Perpendicular drawn from the centre to the chord bisect the chord)
Similarly 
DN=CN

Also 
AB=CD — (2) (Given)
AM+BM=DN+CN
AM+AM=DN+DN
2AM=2DN
AM=DN — (3)

Adding equation (1) and (2) 
AM+MP=DN+NP
AP=DP — (4)

(ii) Subtracting equation (4) from (2)

AB-AP=CD-DP
BP=CP

AD, BE, CF are equal altitudes of a a triangle ABC . . .

Question : AD, BE, CF are equal altitudes of a ΔABC. Prove that ΔABC is an equilateral triangle.

Doubt by Suraj 

Solution : 

Given : AD, BE and CF are altitudes of ΔABC.
AD=BE=CF
To Prove : ABC is an equilateral triangle. 

Proof :
Area of ΔABC
= ½×Base×Height
½×BC×AD — (1) 
Again, 
Area of ΔABC
= ½×Base×Height
½×AB×CF — (2) 

From equation (1) and (2) 
½×BC×AD=½×AB×CF
BC×AD=AB×CF
BC×AD=AB×AD [∵AD=CF]
BC=AB — (3)

Similarly 
BC=AC — (4)

From equation (3) and (4) 
AB=BC=CA
All sides of triangle ABC are equal. 
So, ABC is an equilateral triangle. 
Hence Proved. 

Note : The above question can also be proved by using the concept of congruency. Can you do that by yourself? 

Similar Question : In given figure the altitudes AD, BE and CF, the altitudes of triangle ABC are equal. Prove that ABC is an equilateral triangle.

Similar Question : The altitudes of ΔABC, AD, BE and CF are equal. Prove that ΔABC is an equilateral triangle.

The value of root 32 + root 48 / root 8 + root 12 is equal to . . .

Question : The value of (√32 + √48) / (√8 + √12) is equal to 
(a) √2
(b) 2
(c) 4
(d) 8

Doubt by Suraj 

Solution : 
(√32 + √48) / (√8 + √12)
=(√48 + √32) / (√12 + √8)
=(4√3 + 4√2) / (2√3 + 2√2)

Rationalising the denominator

=(4√3 + 4√2) × (2√3 - 2√2) / (2√3 + 2√2)×(2√3 - 2√2)
=[4√3(2√3 - 2√2) + 4√2(2√3 - 2√2)] / [(2√3)² - (2√2)²]
[∵(a+b)(a-b)=(a²-b²)]
=[8×3-8√6+8√6-8×2] / [12-8]
=[24-0-16] / 4
=[8]/4
=2

Hence, (b) 2, would be the correct option. 

If x3+mx2+nx+6 has (x-2) as a factor & leaves a remainder. . .

Question : If x³+mx²+nx+6 has (x-2) as a factor & leaves a remainder 3 when divided by (x-3), find the values of m and n.

Doubt by Bhumika

Solution : 

Let p(x) = x³+mx²+nx+6
(x-2) is a factor of p(x)
x-2=0
x=2
p(2)=0
(2)³+m(2)²+n(2)+6=0
8+4m+2n+6=0
4m+2n=-14
2(2m+n)=-14
2m+n=-14/2
2m+n=-7 — (1)

Also
When p(x) is divided by (x-3) then remainder is 3.

x-3=0
x=3
p(3)=3
(3)³+m(3)²+n(3)+6=3
27+9m+3n+6=3
9m+3n+33=3
9m+3n=3-33
9m+3n=-30
3(3m+n)=-30
3m+n=-30/3
3m+n=-10 — (2)

Subtracting equation (2) from (1)

2m+n-(3m+n)=-7-(-10 )
2m+n-3m-n=-7+10
-m+0=3
-m=3
m=-3
Putting m=-3 in equation (1)
2(-3)+n=-7 
-6+n=-7
n=-7+6
n=-1

∴ m=-3 & n=-1

If 5^2x-1-25^x-1=2500, find the value . . .

Question : If 52x-1-25x-1=2500, find the value of x.

Doubt by Bhumika

Solution : 

52x-1-25x-1=2500
52x-1-(52)x-1=2500
52x-1-52x-2=2500
52x-1-52x-1-1=2500
52x-1-52x-1÷51=2500
52x-1(1-1/5)=2500
52x-1(4/5)=2500
52x-1=[2500×5]/4
52x-1=3125
52x-1=55
Comparing the exponents both sides
2x-1=5
2x=5+1
2x=6
x=6/2
x=3




Given below is a circle with O. Find the value . . .

Question : Given below is a circle with O. Find the value of ∠BCD in terms of a and b.



(a) 180°+(a-b/2)
(b) 180°-(a+b/2)
(c) 180°-(a-b/2)
(d) None of these. 


Doubt by Vikrant

Solution : 


∠1+b=180° (Linear Pair)
∠1=180°-b — (1)
In ΔOAD
OA=OD (Radii of the same circle)
∠2=∠3 (Angles opposite to equal sides of a triangle are equal)
Also,
∠1+∠2+∠3=180° (ASP)
∠1+∠3+∠3=180° [∵∠2=∠3]
∠1+2∠3=180°
2∠3=180°-∠1
2∠3=180°-(180°-b) [From equation (1)]
2∠3=180°-180°+b
2∠3=b
∠3=b/2 — (2)

In ΔADB
∠3+∠4=a [Exterior Angle Property of the Triangle]

b/2+∠4=a [Using equation (2)]
∠4=a-b/2 — (3)

Now, 
ABCD is a cyclic Quadrilateral

∠BCD+∠4=180° [Sum of opposite angles of a cyclic quadrilateral is supplementary]
∠BCD=180°-∠4
∠BCD=180°-(a-b/2) [Using equation (3)]

Hence, c) 180°-(a-b/2), would be the correct option.

In the given figure, the perpendicular bisector of a chord . . .

Question : In the given figure, the perpendicular bisector of a chord AB of circle PXAQBY intersects the circle at P and Q. Prove that arc PXA ≅ arc PYB.

Doubt by Bhumika

Solution : 

Given : PQ is a perpendicular bisector of AB i.e. AM=BM & ∠PMA=∠PMB=90°
To prove : arc PXA ≅ arc PYB
Proof : 
In ΔPMA and ΔPMB
PM=PM (Common)
∠PMA=∠PMB (Each 90°)
AM=BM (Given)
ΔPMA ≅ ΔPMB (By SAS)
PA=PB (By CPCT)
arc PXA ≅ arc PYB [If two chords are equal, they subtend equal arcs]

Hence Proved

Express the linear equation 6=4x in . . .

Question : Express the linear equation 6=4x in the form ax + by + c = 0 and indicate the value of a, b and c.

Doubt by Bhumika

Solution : 

6=4x
6=4x+0.y
0=4x+0.y-6
OR
4x+0.y-6=0
On comparing with ax+by+c=0
We get
a=4
b=0
c=-6

Find the area of a triangular field, the length of . . .

Question : Find the area of a triangular field, the length of whose sides are 275 m, 660 m and 715 m. What is the cost of cultivating the field at the rate of Rs 200 per hectare? [1 hectare = 10000 m²]

Doubt by Aastha

Solution : 
Here
a=275 m
b=660 m
c=715 m

s = (a+b+c)/2
s = (275+660+715)/2
s = 1650/2
s = 825 m

Using Heron's Formula
Area of triangular field
= √[s(s-a)(s-b)(s-c)]
= √[825(825-275)(825-660)(825-715)]
= √[825×550×165×110]
= √[3×5×5×11×2×5×5×11×3×5×11×2×5×11]
= √[2×2×3×3×5×5×5×5×5×5×11×11×11×11]
= 2×3×5×5×5×11×11
= 30×25×121
= 750×121
= 90750 m²
= (90750/10000) Hectares
= 9.075 Hectares

Cost of cultivating 1 Hectares of field = Rs 200
Cost of cultivating 9.075 Hectares of field = Rs(200×9.075)
= Rs 1815

Evaluate {root[5+2root6]}+{root[8-2root15]}

Question : Evaluate {√[5+2√6]}+{√[8-2√15]}

Doubt by Bhumika

Solution :
 
= {√[5+2√6]}+{√[8-2√15]}
{√[3+2+2√6]}+{√[5+3-2√15]}
{√[(√3)²+(√2)²+2√3.√2]}+{√[(√5)²+(√3)²-2√5.√3]}
{√[√3+√2]²}+{√[√5-√3]²}
[∵ Using Identities
a²+b²+2ab=(a+b)²
a²+b²-2ab=(a-b)² ]
= {√3+√2}+{√5-√3}
= √3+√2+√5-√3
= √2+√5