Ñòóäîïåäèÿ
Íîâèíè îñâ³òè ³ íàóêè:
ÌÀÐÊ ÐÅÃÍÅÐÓÑ ÄÎÑ˲ÄÆÅÍÍß: Íàñê³ëüêè â³äð³çíÿþòüñÿ ä³òè, ÿê³ âèðîñëè â îäíîñòàòåâèõ ñîþçàõ


ÐÅÇÎËÞÖ²ß: Ãðîìàäñüêîãî îáãîâîðåííÿ íàâ÷àëüíî¿ ïðîãðàìè ñòàòåâîãî âèõîâàííÿ


×ÎÌÓ ÔÎÍÄ ÎËÅÍÈ Ï²Í×ÓÊ ² ÌÎÇ ÓÊÐÀ¯ÍÈ ÏÐÎÏÀÃÓÞÒÜ "ÑÅÊÑÓÀËÜͲ ÓÐÎÊÈ"


ÅÊÇÈÑÒÅÍÖ²ÉÍÎ-ÏÑÈÕÎËÎò×Ͳ ÎÑÍÎÂÈ ÏÎÐÓØÅÍÍß ÑÒÀÒÅÂί ²ÄÅÍÒÈ×ÍÎÑÒ² ϲÄ˲ÒʲÂ


Áàòüê³âñüêèé, ãðîìàäÿíñüêèé ðóõ â Óêðà¿í³ çàêëèêຠÌÎÍ çóïèíèòè òîòàëüíó ñåêñóàë³çàö³þ ä³òåé ³ ï³äë³òê³â


³äêðèòå çâåðíåííÿ ̳í³ñòðó îñâ³òè é íàóêè Óêðà¿íè - Ãðèíåâè÷ ˳볿 Ìèõàéë³âí³


Ïðåäñòàâíèöòâî óêðà¿íñüêîãî æ³íîöòâà â ÎÎÍ: íèçüêèé ð³âåíü êóëüòóðè ñï³ëêóâàííÿ â ñîö³àëüíèõ ìåðåæàõ


Ãåíäåðíà àíòèäèñêðèì³íàö³éíà åêñïåðòèçà ìîæå çðîáèòè íàñ ìîðàëüíèìè ðàáàìè


˲ÂÈÉ ÌÀÐÊÑÈÇÌ Ó ÍÎÂÈÕ Ï²ÄÐÓ×ÍÈÊÀÕ ÄËß ØÊÎËßвÂ


²ÄÊÐÈÒÀ ÇÀßÂÀ íà ï³äòðèìêó ïîçèö³¿ Ãàííè Òóð÷èíîâî¿ òà ïðàâà êîæíî¿ ëþäèíè íà ñâîáîäó äóìêè, ñâ³òîãëÿäó òà âèðàæåííÿ ïîãëÿä³â



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Þðèñïóíäåíêöèÿ






ʳëüê³ñí³ ÷èñë³âíèêè âæèâàþòüñÿ äëÿ ïîçíà÷åííÿ íîìåð³â áóäèíê³â, ê³ìíàò, òðàìâà¿â, ðîçì³ð³â îäåæ³ òà âçóòòÿ.

³í æèâå â êâàðòèð³ ¹ 10. Íå lives in flat 10.
³äêðèéòå êíèæêó íà 20 ñòîð³íö³. Open the book page twenty.

Mathematics Related to Construction Industry

The square of the hypotenuse of a right triangle is equal to the sum of the squares of the other two sides.

.

The square of one side of a right triangle equals the squares of the hypotenuse minus the square of the other side.

The area of a triangle is equal to one-half the product of the base and height.

or .

or .

The circumference of a circle is equal to multiplied by the diameter.

.

The area of a circle is equal to multi­plied by the radius squared.

.

The area of a circle is equal to the circum­ference multiplied by one-half the radius.

or .

To find the area of a square or rectangle, multiply the length of one side by the length of an adjacent side.

.

To find the perimeter of a polygon, add the length of all sides.

.

To find the area of a trapezoid, multiply its height by one-half the sum of the parallel sides.

or .

To find the volume of a square or rectan­gular solid, multiply the length by the height by the width.

.

To find the volume of a sphere, multiply the diameter cubed by by one-sixth.

or .

 

 

To find the volume of a cylinder, multiply the area of its base by its height.

To find the volume of a pyramid, multiply the height by one-third its base area.

.

To find the volume of a cone, multiply one-third of the product of its base area by the height.

.

The diagonal of a square is equal to the square root of twice the area.

.

To find the tread width, divide the run of the stairs by the number of treads. This is al­ways one less tread than riser.

.

To find the height of a riser, divide the height of the stairs by the number of risers.

.

 

 

To find the number of risers, divide the height of the stairs by the height of each riser.

.

To find the number of board feet in a piece of lumber, multiply the length in feet by the width in inches by the thickness in inches, divided by 12.

.

To find the electrical resistance in a cir­cuit, divide the voltage ( )by the amperage ( ).

.

To find the electric current in amperes ( ) in a circuit, divide the voltage ( ) by the re­sistance in ohms ( ).

.

To find the voltage in an electric circuit, multiply the current in amperes ( ) by the re­sistance in ohms ( ).

.

 

 



×èòàéòå òàêîæ:

  1. Àíàë³ç òà îö³íêà ³íâåñòóâàííÿ â óìîâàõ ðèçèêó. ßê³ñí³ òà ê³ëüê³ñí³ ìåòîäè îö³íþâàííÿ ïðîåêòíèõ ðèçèê³â.
  2. Âèçíà÷åííÿ îñíîâíèõ ðîçì³ð³â êóëà÷êîâîãî ìåõàí³çìó
  3. Âèçíà÷åííÿ ïîçäîâæí³õ ðîçì³ð³â ò³ëà
  4. Âèçíà÷åííÿ ïîïåðå÷íèõ ðîçì³ð³â ò³ëà (ä³àìåòð³â)
  5. Âèçíà÷åííÿ ðîçì³ð³â âàëà
  6. Âèçíà÷åííÿ ðîçì³ð³â ïëàòè ³ ñòÿãíåíü ïëàòåæ³â çà çàáðóäíåííÿ ÂÐ
  7. Âèì³ðþâàííÿ ë³í³éíèõ òà êóòîâèõ ðîçì³ð³â
  8. Âèì³ðþâàííÿ ë³í³éíèõ òà êóòîâèõ ðîçì³ð³â
  9. Âèì³ðþâàííÿ ðîçì³ð³â äåòàëåé òà øîðñòêóâàòîñò³ ïîâåðõí³
  10. ³äïîâ³äíî äî êàòåãî𳿠áóäèíê³â âèçíà÷àþòüñÿ âèìîãè äî êîíñòðóêòèâíèõ òà ïëàíóâàëüíèõ ð³øåíü áóäèíê³â, ïðèì³ùåíü òà ñïîðóä, ¿õ âîãíåñò³éêîñò³.
  11. Âïëèâ ðîçì³ð³â íàíî÷àñòèíîê íà ¿õí³ ìåõàí³÷í³ âëàñòèâîñò³
  12. ÂÏÐÀÂÀ 3. Âèêîðèñòîâóþ÷è ôîðìè ³ìåííèê³â íà ïîçíà÷åííÿ ïîñàä â äóæêàõ, äàéòå ïðâèëüíèé âàð³àíò ðå÷åííÿ. Ïîÿñí³òü âèá³ð.




Ïåðåãëÿä³â: 750

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