2b:["$","$L2e",null,{"questions":[{"id":4160820,"slug":"what-value-of-y-would-make-aob-a-line-in-the-below-figure-if-angleaoc4y-and-angleboc6y30_2662505","question":"What value of y would make AOB a line in the below figure, If $\\angle\\text{AOC}=4\\text{y}$ and $\\angle\\text{BOC}=(6\\text{y}+30)?$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Since, $\\angle\\text{AOC}$ and $\\angle\\text{BOC}$ are linear pairs
$\\angle\\text{AOC}+\\angle\\text{BOC}=180^\\circ$
6y + 30 + 4y = 180
10y + 30 = 180
10y = 180 - 30
10y = 150
$\\text{y}=\\frac{150}{10}$
y = 15
Hence value of y that will make AOB a line is 15°.
","marks":3},{"id":4160819,"slug":"two-lines-ab-and-cd-intersect-at-o-if-angleaocanglecobanglebod270-deg-find-the-measure-of-_2662506","question":"Two lines AB and CD intersect at O. If $\\angle\\text{AOC}+\\angle\\text{COB}+\\angle\\text{BOD}=270^\\circ,$ find the measure of $\\angle\\text{AOC},\\angle\\text{COB},\\angle\\text{BOD}$ and $\\angle\\text{DOA}.$
","mcq":[null,null,null,null],"answer":"","solution":" $\"\"$
Given:
$\\angle\\text{AOC}+\\angle\\text{COB}+\\angle\\text{BOD}=270^\\circ$
To find:
$\\angle\\text{AOC},\\angle\\text{COB},\\angle\\text{BOD},\\angle\\text{DOA}$
Here,
$\\angle\\text{AOC},\\angle\\text{COB},\\angle\\text{BOD}=270^\\circ$[Complete angle]
⇒ 270 + AOD = 360
⇒ AOD = 360 - 270
⇒ AOD = 90
Now,
AOD + BOD = 180 [Linear pair]
90 + BOD = 180
⇒ BOD = 180 - 90
⇒ BOD = 90
AOD = BOC = 90 [Vertically opposite angles]
BOD = AOC = 90 [Vertically opposite angles]
","marks":3},{"id":4160818,"slug":"prove-that-the-straight-lines-perpendicular-to-the-same-straight-line-are-parallel-to-one-_2662507","question":"Prove that the straight lines perpendicular to the same straight line are parallel to one another.
","mcq":[null,null,null,null],"answer":"","solution":"Let AB and CD be drawn perpendicular to the Line MN
$\\angle\\text{ABD}=90^\\circ$ ... (i) [AB is perpendicular to MN]
$\\angle\\text{CON}=90^\\circ$ ... (ii) [CD is perpendicular to MN ]
Now,
$\\angle\\text{ABD}=\\angle\\text{CDN}=90^\\circ$[From (i) and (ii)]
Therefore, AB || CD, Since corresponding angles are equal.
","marks":3},{"id":4160817,"slug":"in-figure-transversal-l-intersects-two-lines-m-and-n-angle4110-deg-and-angle765-deg-is-m-o_2662508","question":"In figure transversal l intersects two lines m and n, $\\angle{4}=110^\\circ$ and $\\angle{7}=65^\\circ.$ Is m || n?
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Given:
$\\angle{4}=110^\\circ$and $\\angle{7}=65^\\circ.$
To find: is m || n
Here,
$\\angle{7}=\\angle{5}=65^\\circ$ [Vertically opposite angle]
Now,
$\\angle{4}+\\angle{5}=110+65=175^\\circ$
Therefore, m is not parallel to n as the pair of co interior angles is not supplementary.
","marks":3},{"id":4160816,"slug":"in-figure-state-which-lines-are-parallel-and-why_2662509","question":"In figure, state Which lines are parallel and why.
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Vertically opposite angles are equal
$\\Rightarrow\\ \\angle\\text{EOC}=\\angle\\text{DOK}=100^\\circ$
$\\Rightarrow\\ \\angle\\text{DOK}=\\angle\\text{ACO}=100^\\circ$
Here two lines EK and CA cut by a third line and the corresponding angles to it are equal Therefore, EK || AC.
","marks":3},{"id":4160815,"slug":"in-figure-lines-ab-and-cd-are-parallel-and-p-is-any-point-as-shown-in-the-figure-show-that_2662510","question":"In figure, lines AB and CD are parallel and P is any point as shown in the figure. Show that $\\angle\\text{ABP}+\\angle\\text{CDP}=\\angle\\text{DPB}.$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"$2f","marks":3},{"id":4160814,"slug":"in-figure-arms-ba-and-bc-of-angleabc-are-respectively-parallel-to-arms-ed-and-ef-of-angled_2662511","question":"In figure, arms BA and BC of $\\angle\\text{ABC}$ are respectively parallel to arms ED and EF of $\\angle\\text{DEF}.$ Prove that $\\angle\\text{ABC}=\\angle\\text{DEF}.$
$\"\"$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Given
AB || DE and BC || EF
To Prove:
$\\angle\\text{ABC}=\\angle\\text{DEF}$
Construction: Produce BC to x such that it intersects DE at M.
Proof: Since AB || DE and BX is the transversal
ABC = DMX ...(1) [Corresponding angle]
Also,
BX || EF and DE is the transversal
DMX = DEF ...(2) [Corresponding angles]
From (1) and (2)
$\\angle\\text{ABC}=\\angle\\text{DEF}$
","marks":3},{"id":4160813,"slug":"in-figure-ab-oror-cd-oror-ef-and-gh-oror-kl-find-anglehkl_2662512","question":"In figure, AB || CD || EF and GH || KL. Find $\\angle\\text{HKL}.$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Produce LK to meet GF at N.
Now, alternative angles are equal
$\\angle\\text{CHG}=\\angle\\text{HGN}=60^\\circ$
$\\angle\\text{HGN}=\\angle\\text{KNF}=60^\\circ$ [Corresponding angles]
Hence,
$\\angle\\text{KNG}=180-60=120$
$\\Rightarrow\\ \\angle\\text{GNK}=\\angle\\text{AKL}=120^\\circ$ [Corresponding angles]
$\\angle\\text{AKH}=\\angle\\text{KHD}=25^\\circ$ [alternative angles]
Therefore,
$\\angle\\text{HKL}=\\angle\\text{AKH}+\\angle\\text{AKL}=25+120=145^\\circ.$
","marks":3},{"id":4160812,"slug":"in-figure-ab-oror-cd-and-p-is-any-point-shown-in-the-figure-prove-that-angleabpanglebpdang_2662513","question":"In figure, AB || CD and P is any point shown in the figure. Prove that: $\\angle\\text{ABP}+\\angle\\text{BPD}+\\angle\\text{CDP}=360^\\circ$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"$30","marks":3},{"id":4160811,"slug":"in-figure-show-that-ab-oror-ef_2662514","question":"In figure, show that AB || EF.
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Produce EF to intersect AC at K.
Now,
$\\angle\\text{DCE}+\\angle\\text{CEF}=35+145=180^\\circ$
Therefore, EF || CD ... (1) [Since Sum of Co-interior angles is 180]
Now,
$\\angle\\text{BAC}=\\angle\\text{ACD}=57^\\circ$
⇒ BA || EF ... (2) [Alternative angles are equal]
From (1) and (2)
AB || EF [Since, Lines parallel to the same line are parallel to each other]
Hence proved.
","marks":3},{"id":4160810,"slug":"in-figure-pq-oror-ab-and-pr-oror-bc-if-angleqpr102-deg-determine-angleabc-give-reasons_2662515","question":"In figure, PQ || AB and PR || BC. If $\\angle\\text{QPR}=102^\\circ,$ determine $\\angle\\text{ABC}.$ Give reasons.
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"AB is produce to meet PR at K
Since PQ || AB
$\\angle\\text{QPR}=\\angle\\text{BKR}=102^\\circ$[corresponding angles]
Since PR ∥ BC
$\\angle\\text{RKB}+\\angle\\text{CBK}=180^\\circ$[Since Corresponding angles are supplementary]
$\\angle\\text{CKB}=180-102=78$
$\\therefore\\ \\angle\\text{CKB}=78^\\circ$
","marks":3},{"id":4160809,"slug":"in-figure-p-is-a-transversal-to-lines-m-and-n-angle2120-deg-and-angle560-deg-prove-that-m-_2662516","question":"In figure, p is a transversal to lines m and n, $\\angle{2}=120^\\circ$and $\\angle{5}=60^\\circ.$Prove that m || n.
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Given that
$\\angle{2}=120^\\circ$ and $\\angle{5}=60^\\circ.$
To prove,
$\\angle{2}+\\angle{1}=180^\\circ$ [Linear pair]
$120+\\angle{1}=180^\\circ$
$\\angle{1}=180-120$
$\\angle{1}=60^\\circ$
Since $\\angle{1}=\\angle{5}=60^\\circ$
Therefore, m || n. [As pair of corresponding angles are equal]
","marks":3},{"id":4160808,"slug":"in-figure-oa-and-ob-are-opposite-rays-if-x-25-what-is-the-value-of-y_2662517","question":"In figure, OA and OB are opposite rays:
If x = 25°, what is the value of y?
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Given that,
x = 25
Since $\\angle\\text{AOC}$ and $\\angle\\text{BOC}$ form a linear pair
$\\angle\\text{AOC}+\\angle\\text{BOC}=180^\\circ$
Given that
$\\angle\\text{AOC}=2\\text{y}+5$ and $\\angle\\text{BOC}=3\\text{x}$
$\\angle\\text{AOC}+\\angle\\text{BOC}=180^\\circ$
(2y + 5) + 3x = 180
(2y + 5) + 3(25) = 180
2y + 5 + 75 = 180
2y + 80 = 180
2y = 180 - 80 = 100
$\\text{y}=\\frac{100}{2}$
y = 50
","marks":3},{"id":4160807,"slug":"in-figure-angle160-deg-and-angle2big-div-23bigrd-of-a-right-angle-prove-that-lm_2662518","question":"In figure, $\\angle{1}=60^\\circ$ and $\\angle{2}=\\Big(\\frac{2}{3}\\Big)^\\text{rd}$ of a right angle. Prove that l∥m.
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Given:
$\\angle{1}=60^\\circ$ and $\\angle{2}=\\Big(\\frac{2}{3}\\Big)^\\text{rd}$ of a right angle
To Prove:
Parallel Drawn to m
Proof:
$\\angle{1}=60^\\circ$
$\\angle{2}=\\Big(\\frac{2}{3}\\Big)\\times90=60$
Since
$\\angle{1}=\\angle{1}=60^\\circ$
Therefore, Parallel to m as pair of corresponding angles are equal.
","marks":3},{"id":4160806,"slug":"in-figure-poq-is-a-line-ray-or-is-perpendicular-to-line-pq-os-is-another-ray-lying-between_2662519","question":"In figure POQ is a line. Ray OR is perpendicular to line PQ. OS is another ray lying between rays OP and OR. Prove that $\\angle\\text{ROS}=\\frac{1}{2}(\\angle\\text{QOS}-\\angle\\text{POS}).$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Given that
OR perpendicular
$\\therefore\\angle\\text{POR}=90^\\circ$
$\\angle\\text{POS}+\\angle\\text{SOR}=90$ $[\\therefore\\angle\\text{POR}=\\angle\\text{POS}+\\angle\\text{SOR}]$
$\\angle\\text{ROS}=90^\\circ-\\angle\\text{POS}\\dots(1)$
$\\angle\\text{QOR}=90$ $(\\because\\text{OR}\\perp\\text{PQ})$
$\\angle\\text{QOS}-\\angle\\text{ROS}=90^\\circ$
$\\angle\\text{ROS}=\\angle\\text{QOS}-90^\\circ\\dots(2)$
By adding (1) and (2) equations, we get:
$\\therefore\\ \\angle\\text{ROS}=\\angle\\text{QOS}-\\angle\\text{POS}$
$\\angle\\text{ROS}=\\frac{1}{2}(\\angle\\text{QOS}-\\angle\\text{POS})$
","marks":3},{"id":4160805,"slug":"in-figure-if-l-oror-m-np-and-angle185-deg-find-angle2_2662520","question":"In figure if l || m, n∥p and $\\angle\\text{1}=85^\\circ,$ find $\\angle{2}.$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Corresponding angles are equal
$\\Rightarrow\\ \\angle{1}=\\angle{3}=85^\\circ$
By using the property of co-interior angles are supplementary
$\\angle{2}+\\angle{3}=180^\\circ$
$\\angle{2}+55=180^\\circ$
$\\angle{2}=180-85$
$\\angle{2}=95^\\circ$
","marks":3},{"id":4160804,"slug":"in-figure-l-m-and-n-are-parallel-lines-intersected-by-transversal-p-at-x-y-and-z-respectiv_2662521","question":"In figure, l, m and n are parallel lines intersected by transversal p at X. Y and Z respectively. Find $\\angle\\text{1},\\angle\\text{2}$ and $\\angle\\text{3}.$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"From the given figure:
$\\angle\\text{3}+\\angle\\text{myz}=180^\\circ$ [Linear pair]
$\\Rightarrow\\ \\angle{3}=180-120$
$\\Rightarrow\\ \\angle3=60^\\circ$
Now line I parallel to m
$\\angle{1}=\\angle{3}$ [Corresponding angles]
$\\angle{1}=60^\\circ$
Also m parallel to n
$\\Rightarrow\\ \\angle{2}=120^\\circ$ [Alternative interior angle]
Hence,
$\\angle{1}=\\angle{3}=60^\\circ$
$\\angle{2}=120^\\circ$
","marks":3},{"id":4160803,"slug":"in-figure-lines-ab-and-cd-intersect-at-o-if-angleaocangleboe70-deg-and-anglebod40-deg-find_2662522","question":"In figure, lines AB and CD intersect at O. If $\\angle\\text{AOC}+\\angle\\text{BOE}=70^\\circ$ and $\\angle\\text{BOD}=40^\\circ,$ find $\\angle\\text{BOE}$ and reflex $\\angle\\text{COE}.$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"In the figure, $\\angle\\text{AOC},\\angle\\text{BOE}$ and $\\angle\\text{COE} $ from a linear pair.
Thus, $\"\"$
$\\angle\\text{AOC}+\\angle\\text{BOE}+\\angle\\text{COE}=180^\\circ$
It is given that $\\angle\\text{AOC}+\\angle\\text{BOE}=70^\\circ,$ on substituting this value, we get:
$70^\\circ+\\angle\\text{COE}=180^\\circ$
$\\angle\\text{COE}=180^\\circ-70^\\circ$
$\\angle\\text{COE}=110^\\circ$
Thus, reflex $\\angle\\text{COE}=360^\\circ-110^\\circ$
Therefore, reflex $\\angle\\text{COE}=250^\\circ.$
","marks":3},{"id":4160802,"slug":"if-the-complement-of-an-angle-is-equal-to-the-supplement-of-the-thrice-of-it-find-the-meas_2662523","question":"If the complement of an angle is equal to the supplement of the thrice of it. Find the measure of the angle.
","mcq":[null,null,null,null],"answer":"","solution":"Let the measure of the angle be x°.
Its complement will be (90° - x°) and its supplement will be (180° - x°).
Supplement of thrice of the angle = (180° - 3x°)
According to the given information:
(90° - x°) = (180° - 3x°)
3x - x = 180 - 90
2x = 90
x = 45
Thus, the measure of the angle is 45°.
The measure of the angle is 45°.
","marks":3},{"id":4160801,"slug":"if-figure-if-ab-oror-cd-and-cd-oror-ef-find-angleace_2662524","question":"If figure, if AB || CD and CD || EF, find $\\angle\\text{ACE}.$
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Since EF || CD
Therefore, EFC + ECD = 180 [Co-interior angles are supplementary]
⇒ ECD = 180 - 130 = 50
Also BA || CD
⇒ BAC = ACD = 70 [alternative angles]
But, ACE + ECD = 70
⇒ ACE = 70 - 50 = 20
","marks":3},{"id":4160800,"slug":"if-a-wheel-has-six-spokes-equally-spaced-then-find-the-measure-of-the-angle-between-two-ad_2662525","question":"If a wheel has six spokes equally spaced, then find the measure of the angle between two adjacent spokes.
","mcq":[null,null,null,null],"answer":"","solution":"It is given that the six spokes are equally spaced, thus, two adjacent spokes subtend equal angle at the centre of the wheel.
Let that angle measures x°.
Also,
The six spokes form a complete angle, that is 360°.
Therefore,
x + x + x + x + x + x = 360°
6x = 360°
$\\text{x}=\\frac{360^\\circ}{6}$
x = 60°
Hence, the measure of the angle between two adjacent spokes measures 60°.
","marks":3},{"id":4160799,"slug":"how-many-pairs-of-adjacent-angles-in-all-can-you-name-in-figure-1036_2662526","question":"How many pairs of adjacent angles, in all, can you name in figure 10.36.
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"Pairs of adjacent angles are:
$\\angle\\text{EOC},\\angle\\text{DOC}$
$\\angle\\text{EOD},\\angle\\text{DOB}$
$\\angle\\text{DOC},\\angle\\text{COB}$
$\\angle\\text{EOD},\\angle\\text{DOA}$
$\\angle\\text{DOC},\\angle\\text{COA}$
$\\angle\\text{BOC},\\angle\\text{BOA}$
$\\angle\\text{BOA},\\angle\\text{BOD}$
$\\angle\\text{BOA},\\angle\\text{BOE}$
$\\angle\\text{EOC},\\angle\\text{COA}$
$\\angle\\text{EOC},\\angle\\text{COB}$
Hence, 10 pair of adjacent angles.
","marks":3},{"id":4160798,"slug":"how-many-pairs-of-adjacent-angles-are-formed-when-two-lines-intersect-in-a-point_2662527","question":"How many pairs of adjacent angles are formed when two lines intersect in a point?
","mcq":[null,null,null,null],"answer":"","solution":"Let us draw the following diagram showing two lines AB and CD intersecting at a point O.
$\"\"$
We have the following pair of adjacent angles, so formed:
$\\angle\\text{AOC}$ and $\\angle\\text{BOC}$
$\\angle\\text{AOC}$ and $\\angle\\text{AOD}$
$\\angle\\text{BOD}$ and $\\angle\\text{BOC}$
$\\angle\\text{BOD}$ and $\\angle\\text{AOD}$
Hence, in total four pair of adjacent angles are formed.
","marks":3},{"id":4160797,"slug":"given-anglepor3x-and-angleqor2x10-find-the-value-of-x-for-which-poq-will-be-a-line-figure-_2662528","question":"Given $\\angle\\text{POR}=3\\text{x}$ and $\\angle\\text{QOR}=2\\text{x}+10,$ Find the value of x for which POQ will be a line. (Figure 10.41).
$\"\"$
","mcq":[null,null,null,null],"answer":"","solution":"For the case that POR is a line
$\\angle\\text{POR}$ and $\\angle\\text{QOR}$ are linear parts
$\\angle\\text{POR}+\\angle\\text{QOR}=180^\\circ$
Also, given that,
$\\angle\\text{POR}=3\\text{x}$ and $\\angle\\text{QOR}=2\\text{x}+10$
2x + 10 + 3x = 180
5x + 10 = 180
5x = 180 - 10
5x = 170
x = 34
Hence the value of x is 34°
","marks":3},{"id":4160796,"slug":"define-supplementary-angles_2662529","question":"Define supplementary angles.
","mcq":[null,null,null,null],"answer":"","solution":"supplementary Angles: Two angles, the sum of whose measures is 180°, are called suppplementary angles.
Thus,
angles $\\angle\\text{BAC}$ and $\\angle\\text{DAC}$ are aupplementary angles.
If x + y = 180°
$\"\"$
Example 1: Angles of measure 50° and 130° are supplementary angles, because
50° + 130° = 180°
Example 2: Angles of measure 60° and 120° are supplementary angles, because
60° + 120° = 180°
","marks":3},{"id":4160795,"slug":"an-angle-is-equal-to-its-supplement-determine-its-measure_2662530","question":"An angle is equal to its supplement. Determine its measure.
","mcq":[null,null,null,null],"answer":"","solution":"Let the supplement of the angle be x°.
According the given statement, the required angle is equal to its supplement, therefore, the required angle becomes x°.
Sine both the angles are supplementary, therefore, their sum must be equal to 180°.
Or we can say that:
x + x = 180°
2x = 180°
$\\text{x}=\\frac{180^\\circ}{2}$
x = 90°
Hence, the required angle measures 90°.
","marks":3},{"id":4160794,"slug":"an-angle-is-equal-to-five-x-its-complement-determine-its-measure_2662531","question":"An angle is equal to five times its complement. Determine its measure.
","mcq":[null,null,null,null],"answer":"","solution":"Let the complement of the required angle measures x°.
Therefore, the required angle becomes 5x°.
Since, the angles are complementary.
Thus, their sum must be equal to 90°.
Or we can say that :
x + 5x = 90°
6x = 90°
$\\text{x}=\\frac{90^\\circ}{6}$
x = 15°
Hence, the required angle becomes:
5x = 5(15°)
= 75°.
","marks":3},{"id":4160793,"slug":"ab-cd-and-ef-are-three-concurrent-lines-passing-throught-the-point-o-such-that-of-bisects-_2662532","question":"AB, CD and EF are three concurrent lines passing throught the point O such that OF bisects $\\angle\\text{BOD}.$ If $\\angle\\text{BOF}=35^\\circ,$ find $\\angle\\text{BOC}$ and $\\angle\\text{AOD}.$
","mcq":[null,null,null,null],"answer":"","solution":" $\"\"$
$\\angle\\text{BOF}=35^\\circ$
$\\therefore\\angle\\text{BOD}=2\\angle\\text{BOF}=70^\\circ$ $[\\because$ OF bisects $\\angle\\text{BOD}]$
$\\angle\\text{BOD}=\\angle\\text{AOC}=70^\\circ$ [vertically opposite angles]
Now,
$\\angle\\text{BOC}+\\angle\\text{AOC}=180^\\circ$ [linear pair]
$\\Rightarrow\\ \\angle\\text{BOC}+70^\\circ=180^\\circ$
$\\Rightarrow\\ \\angle\\text{BOC}=110^\\circ$
$\\therefore\\ \\angle\\text{AOD}=\\angle\\text{BOC}=110^\\circ$ [vertically opposite angles]
","marks":3}],"topicId":13941,"topicName":"3 Marks Question"}]

Maths 3 Marks Question

3 Marks Question

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