Have a query? Ask a Tutor!!

Access to best educators and exclusive paper discussions

Can’t find what you’re looking for?

Our tutors are from top schools around the world, and they are waiting for you 24/7, anytime, anywhere.

Homework- One to One Solutions
Understand concepts to solve better
Get your doubts solved instantly

Maths-

General

Easy

Question

if $ell parallel to m$ find the value of x in given figure.

$14^{\circ}$
$24^{\circ}$
$34^{\circ}$
$44^{\circ}$

The correct answer is: $34 to the power of ring operator end exponent$

Related Questions to study

The number of positive integral solutions of the inequation $fraction numerator x squared left parenthesis 3 x minus 4 right parenthesis cubed left parenthesis x minus 2 right parenthesis to the power of 4 over denominator left parenthesis x minus 5 right parenthesis to the power of 5 left parenthesis 2 x minus 7 right parenthesis to the power of 6 end fraction less or equal than 0$ is –

The number of positive integral solutions of the inequation $fraction numerator x squared left parenthesis 3 x minus 4 right parenthesis cubed left parenthesis x minus 2 right parenthesis to the power of 4 over denominator left parenthesis x minus 5 right parenthesis to the power of 5 left parenthesis 2 x minus 7 right parenthesis to the power of 6 end fraction less or equal than 0$ is –

Set of values of x satisfying the inequality $fraction numerator left parenthesis x minus 3 right parenthesis squared left parenthesis 2 x plus 5 right parenthesis squared left parenthesis x minus 7 right parenthesis over denominator open parentheses x squared plus x plus 1 close parentheses left parenthesis 3 x plus 6 right parenthesis squared end fraction less or equal than 0$ is $left square bracket a comma b right parenthesis union left parenthesis b comma c right square bracket$ then 2a + b + c is equal to

Set of values of x satisfying the inequality $fraction numerator left parenthesis x minus 3 right parenthesis squared left parenthesis 2 x plus 5 right parenthesis squared left parenthesis x minus 7 right parenthesis over denominator open parentheses x squared plus x plus 1 close parentheses left parenthesis 3 x plus 6 right parenthesis squared end fraction less or equal than 0$ is $left square bracket a comma b right parenthesis union left parenthesis b comma c right square bracket$ then 2a + b + c is equal to

Number of integral values of x for which the inequality log₁₀ $open parentheses fraction numerator 2 x minus 2007 over denominator x plus 1 end fraction close parentheses$ $less or equal than$ 0 holds true, is

Number of integral values of x for which the inequality log₁₀ $open parentheses fraction numerator 2 x minus 2007 over denominator x plus 1 end fraction close parentheses$ $less or equal than$ 0 holds true, is

parallel

$x to the power of log subscript 5 invisible function application x end exponent greater than 5$ implies

$x to the power of log subscript 5 invisible function application x end exponent greater than 5$ implies

log4 (2x2 + x + 1) – log² (2x – 1) $less or equal than$ – tan $fraction numerator 7 pi over denominator 4 end fraction$

log4 (2x2 + x + 1) – log² (2x – 1) $less or equal than$ – tan $fraction numerator 7 pi over denominator 4 end fraction$

The solution set of the inequation log1/3 (x² + x + 1) + 1 > 0 is

The solution set of the inequation log1/3 (x² + x + 1) + 1 > 0 is

parallel

If $open parentheses a to the power of log subscript b end subscript invisible function application x end exponent close parentheses to the power of 2 end exponent$ –5 $x to the power of log subscript b end subscript invisible function application a end exponent$ + 6 = 0 where a > 0, b > 0 & ab $not equal to$ 1. Then the value of x is equal to

If $open parentheses a to the power of log subscript b end subscript invisible function application x end exponent close parentheses to the power of 2 end exponent$ –5 $x to the power of log subscript b end subscript invisible function application a end exponent$ + 6 = 0 where a > 0, b > 0 & ab $not equal to$ 1. Then the value of x is equal to

No. of ordered pair satisfying simultaneously the system of equation $2 to the power of square root of x end exponent$ . $2 to the power of square root of y end exponent$ = 256 & log10 $square root of x y end root$ – log10 1.5 = 1 is.

No. of ordered pair satisfying simultaneously the system of equation $2 to the power of square root of x end exponent$ . $2 to the power of square root of y end exponent$ = 256 & log10 $square root of x y end root$ – log10 1.5 = 1 is.

If $x to the power of left square bracket log subscript 3 end subscript invisible function application x to the power of 2 end exponent plus left parenthesis log subscript 3 end subscript invisible function application x right parenthesis to the power of 2 end exponent minus 10 right square bracket end exponent$ = 1/x², then x =

If $x to the power of left square bracket log subscript 3 end subscript invisible function application x to the power of 2 end exponent plus left parenthesis log subscript 3 end subscript invisible function application x right parenthesis to the power of 2 end exponent minus 10 right square bracket end exponent$ = 1/x², then x =

parallel

If x_n > x_n–1>...> x₂ > x₁ > 1 then the value of $log subscript straight x subscript 1 end subscript invisible function application log subscript straight x subscript 2 end subscript invisible function application log subscript straight x subscript 3 end subscript invisible function application horizontal ellipsis log subscript straight x subscript straight n end subscript invisible function application x subscript n$ $blank to the power of x subscript n minus 1 end subscript superscript up right diagonal ellipsis to the power of x subscript 1 end exponent end superscript end exponent$ is equal to-

If x_n > x_n–1>...> x₂ > x₁ > 1 then the value of $log subscript straight x subscript 1 end subscript invisible function application log subscript straight x subscript 2 end subscript invisible function application log subscript straight x subscript 3 end subscript invisible function application horizontal ellipsis log subscript straight x subscript straight n end subscript invisible function application x subscript n$ $blank to the power of x subscript n minus 1 end subscript superscript up right diagonal ellipsis to the power of x subscript 1 end exponent end superscript end exponent$ is equal to-

The expression logp where $p greater or equal than 2 comma p element of N semicolon n element of N$ when simplified is.

The expression logp where $p greater or equal than 2 comma p element of N semicolon n element of N$ when simplified is.

Let N= $open parentheses open parentheses square root of 7 close parentheses to the power of fraction numerator 2 over denominator log subscript 25 end subscript invisible function application 7 end fraction end exponent minus 12 5 to the power of log subscript 25 end subscript invisible function application 6 end exponent close parentheses$ Then log₂N has the value –

Let N= $open parentheses open parentheses square root of 7 close parentheses to the power of fraction numerator 2 over denominator log subscript 25 end subscript invisible function application 7 end fraction end exponent minus 12 5 to the power of log subscript 25 end subscript invisible function application 6 end exponent close parentheses$ Then log₂N has the value –

parallel

If a² + 4b² = 12ab, then log (a + 2b) =

If a² + 4b² = 12ab, then log (a + 2b) =

Given that log_px = α and log_qx = β, then value of log_p_/q x equals-

Given that log_px = α and log_qx = β, then value of log_p_/q x equals-

If f(x) is the primitive of $fraction numerator sin invisible function application root index 3 of x end root log invisible function application left parenthesis 1 plus 3 x right parenthesis over denominator left parenthesis tan to the power of – 1 end exponent invisible function application square root of x right parenthesis to the power of 2 end exponent left parenthesis e to the power of root index 3 of x end root end exponent – 1 right parenthesis end fraction$ (x $not equal to$ 0), then $stack l i m with x rightwards arrow 0 below$ f ' (x) is -

If f(x) is the primitive of $fraction numerator sin invisible function application root index 3 of x end root log invisible function application left parenthesis 1 plus 3 x right parenthesis over denominator left parenthesis tan to the power of – 1 end exponent invisible function application square root of x right parenthesis to the power of 2 end exponent left parenthesis e to the power of root index 3 of x end root end exponent – 1 right parenthesis end fraction$ (x $not equal to$ 0), then $stack l i m with x rightwards arrow 0 below$ f ' (x) is -

parallel

card img

With Turito Academy.

card img

With Turito Foundation.

card img

Get an Expert Advice From Turito.

Turito Academy

card img

With Turito Academy.

Test Prep

card img

With Turito Foundation.